Methods of Regional Citrate Anticoagulation Dialysis

The entire teachings of the above applications are incorporated herein by reference.

BACKGROUND OF THE INVENTION

Renal dysfunction or failure and, in particular, end-stage renal disease, causes the body to lose the ability to remove water and minerals and excrete harmful metabolites, maintain acid-base balance and control electrolyte and mineral concentrations within physiological ranges. Toxic uremic waste metabolites including urea, creatinine, and uric acid accumulate in the body's tissues which can result in a person's death if the filtration function of the kidney is not replaced.

Dialysis is commonly used to replace kidney function by removing these waste toxins and excess water. In one type of dialysis treatment—hemodialysis (HD)—toxins are filtered from a patient's blood externally in a hemodialysis machine. Blood passes from the patient through a dialyzer separated by a semi-permeable membrane from a large volume of externally-supplied dialysate. Typically, the blood passes through the inside of semi-permeable hollow fibers, and the dialysate flows on the outside of the semi-permeable hollow fibers in a countercurrent direction. The waste and toxins dialyze out of the blood through the semi-permeable membrane into the dialysate, which is then discarded.

The patient's blood is exposed to intravenous cannulas, tubing, drip chambers, headers, potting compound, and dialysis membranes during the dialysis procedure. These surfaces exhibit a variable degree of thrombogenicity and may initiate clotting of blood, especially in conjunction with exposure of blood to air in drip chambers. The resulting thrombus formation may be significant enough to cause occlusion and malfunction of the extracorporeal circuit. See J. T. Daugirdas, P. G. Blake, and T. S. Ing, Handbook of Dialysis, (2007).

One method of preventing blood clotting is to administer heparin to the patient, shortly before or during the dialysis treatment. Heparin, however, has potential undesirable side effects, such as, for example, pruritus, allergy, osteoporosis, hyperlipidemia, thrombocytopenia, and excessive bleeding. Heparin is therefore not recommended for patients at risk of bleeding due to gastrointestinal lesions (gastritis, peptic ulcer, angiodysplasia), recent surgery, or pericarditis.

Another method of preventing blood clotting is regional citrate anticoagulation (RCA), which can be used alone or combined with and potentially reduce heparin administration. RCA has been shown to reduce complement activation, degranulation of granulocytes and platelets and the release of IL-1b, thus improving biocompatibility of the extracorporeal circuit. Bohler J., Schollmeyer P., Dressel B., Dobos G., Horl W. H.: Reduction of granulocyte activation during hemodialysis with regional citrate anticoagulation: dissociation of complement activation and neutropenia from neutrophil degranulation. J Am Soc Nephrol 7:234-241. 1996; Gabutti L., Ferrari N., Mombelli G., Keller F., Marone C.: The favorable effect of regional citrate anticoagulation on interleukin-1 beta release is dissociated from both coagulation and complement activation. J Nephrol 17:819-825. 2004; Gritters M., Grooteman M. P., Schoorl M., Schoorl M., Bartels P. C., Scheffer P. G., Teerlink T., Schalkwijk C. G., Spreeuwenberg M., Nube M. J.: Citrate anticoagulation abolishes degranulation of polymorphonuclear cells and platelets and reduces oxidative stress during haemodialysis. Nephrol Dial Transplant 21:153-159. 2006. The actual anticoagulative effect of RCA in the dialyzer has also been demonstrated to be superior to both unfractionated and low-molecular-weight heparin. Hofbauer R., Moser D., Frass M., Oberbauer R., Kaye A. D., Wagner O., Kapiotis S., Druml W.: Effect of anticoagulation on blood membrane interactions during hemodialysis. Kidney Int 56:1578-1583. 1999. More recently, the sharp rise of heparin costs has further spurred interest in RCA as an alternative mode of anticoagulation.

The application of regional citrate anticoagulation (RCA) in hemodialysis classically involves citrate infusion before the hemodialyzer, calcium infusion after the dialyzer, and use of a calcium-free dialysate. The extremely low ionized calcium (iCa) levels generated by infusion of citrate into the arterial line prevent clotting in the extracorporeal circuit but have to be raised again in the venous line before the blood re-enters the patient's systemic circulation. Citrate infusion and calcium infusion have to be balanced carefully in order to avoid systemic hypo- or hypercalcemia in the patient. See U.S. application Ser. No. 12/580,803, filed on Oct. 16, 2009. This requires close monitoring of systemic iCa levels, which is classically accomplished by repetitive blood draws and iCa measurements throughout the dialysis treatment. This is a labor- and material-intensive process.

An attempt to provide heparin-free anticoagulation without the need for citrate infusion and calcium infusion by employing a commercially available dialysate containing both calcium and citrate (Citrasate® citrate dialysate) resulted in clotting of the hemodialyzer in 2 out of 10 cases in one study. Dittrich et al. J Am Soc Nephrol 19 (2008), page 461A, abstract F-PO1576. This demonstrates that Citrasate® citrate dialysate alone does not provide sufficient anticoagulation, which can be ascribed to the iCa concentration along the hollow fibers not being below the level required for adequate anticoagulation.

Therefore, there is a need for a method of preventing blood clotting during a dialysis treatment of a patient that reduces or eliminates the problems described above.

SUMMARY OF THE INVENTION

The invention is generally directed to the combined use of citrate infusion and a dialysate containing both citrate and calcium in dialysis of a patient's blood. This combination enables adequate anticoagulation in the extracorporeal dialysis circuit while the calcium in the dialysate reduces or eliminates the requirement for post-dialyzer calcium infusion.

In one embodiment, a method of performing regional citrate anticoagulant dialysis of a patient's blood includes flowing blood from and back to the patient through an extracorporeal circuit including a dialyzer having semi-permeable dialysis membranes and a dialysate chamber surrounding the membranes. The method further includes flowing a dialysate containing calcium and citrate through the dialysate chamber of the dialyzer and introducing citrate into the patient's blood upstream of the dialyzer in a sufficient amount to reduce clotting of the patient's blood in the extracorporeal dialysis circuit, whereby the patient's blood is dialyzed. In certain embodiments, the amount of calcium contained in the dialysate is sufficient to significantly reduce or eliminate the need for calcium to be added to the patient's blood downstream of the dialyzer. In some embodiments, the citrate can be sodium citrate. In other embodiments, the citrate can be sodium isocitrate. In certain embodiments, the step of introducing the citrate can include time periods when the amount of citrate is modulated downwardly, alternating with time periods when the amount of citrate is modulated upwardly. In some embodiments, the step of introducing the citrate can be computer controlled, including using a processor to computationally determine one or more amounts of citrate during dialysis treatment of a patient, the processor coupled between the patient and the dialyzer. In certain embodiments, the method can further include the step of flushing the dialysis membranes during the time periods when the amount is modulated downwardly. The dialysis membranes can be flushed with a liquid selected from the group consisting of bicarbonate containing dialysate, lactate containing dialysate, acetate containing dialysate, calcium containing dialysate, calcium and citrate anticoagulant containing dialysate, dextrose solutions, and saline. In some embodiments, the step of introducing the citrate can be followed by the step of introducing heparin into the extracorporeal dialysis circuit.

In another embodiment, the method can further include predicting the concentration of systemic ionized calcium in the blood of the patient at any point in the dialysis treatment or post-dialysis. In some embodiments, predicting the concentration of systemic ionized calcium concentration in the blood of the patient is accomplished using a mathematical model. Using a mathematical model can include employing citrate generation and metabolism to determine resulting citrate and calcium equilibria, determining citrate and calcium concentration changes caused by recirculation, determining a required pre-dialyzer citrate concentration and resulting citrate and calcium concentrations, determining a dialysate composition, determining diffusive and convective dialyzer fluxes, and determining post-dialyzer citrate and calcium concentrations. In some embodiments, using a mathematical model can yield a preliminary predicted post-dialysis systemic ionized calcium concentration. The method can further include statistically correcting the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood to provide a final predicted post-dialysis systemic ionized calcium concentration. Statistically correcting the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood can include classifying the patient's parathyroid hormone (PTH) level or alkaline phosphatase (AP) level into at least two categories (e.g., tertiles) of PTH or AP levels based on concentration, and estimating a difference between the preliminary predicted and the actual concentration of post-dialysis systemic ionized calcium in the patient's blood based on the category of the PTH or AP level of the patient, dialysis treatment time, and the preliminary predicted post-dialysis concentration of systemic ionized calcium, thereby obtaining a correction to the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood. The difference between the preliminary predicted and actual concentration of post-dialysis systemic ionized calcium in the patient's blood can be determined by employing a multivariate linear regression model including the category of the PTH or AP level of the patient, dialysis treatment time, and the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood. In some embodiments, the introduced citrate and the citrate in the dialysate can be individually selected from sodium citrate and sodium isocitrate.

In certain embodiments, estimating the difference between the preliminary predicted concentration and the actual concentration of systemic ionized calcium in the patient's blood can be performed for any time point during dialysis and includes estimating a slope of the relationship between a prediction error, obtained from the preliminary predicted systemic ionized calcium concentration minus the actual measured systemic ionized calcium concentration, and the elapsed time of dialysis, and multiplying the slope by the elapsed time of dialysis for the time point of interest. The prediction error slope can be estimated by employing a multivariate linear regression model including the category (e.g., tertiles) of PTH or AP level of the patient and the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood as predictors.

In yet another embodiment, a method of modeling a concentration of citrate and calcium in dialyzing blood of a patient includes the computer implemented steps of determining a blood flow rate from and back to the patient through an extracorporeal dialysis circuit including a dialyzer having semi-permeable dialysis membranes and a dialysate chamber surrounding the membranes, determining a flow rate through the dialysate chamber of the dialyzer of a dialysate that includes a predetermined amount of calcium and a predetermined amount of citrate, and computing an amount of citrate anticoagulant to be introduced into the blood, upstream of the dialyzer, such that ionized calcium is reduced upstream of the dialyzer to a concentration that is sufficiently small to reduce clotting of the flowing blood. The method can further include computing a serum concentration of ionized calcium in the blood of the patient, and computing a concentration of citrate in the blood of the patient. In some embodiments, computing the amount of citrate anticoagulant to be introduced includes computationally determining for a given patient certain time periods when the amount of citrate is to be modulated downwardly, and alternating time periods when the amount of citrate is to be modulated upwardly. In certain embodiments, the method is employed during dialysis treatment of a patient. The method can further include maintaining or adjusting the patient's intradialytic calcium mass balance to desired levels relative to the patient's interdialytic intakes of calcium during a time in which the patient is undergoing dialysis treatment using a dialyzer that includes a dialysate containing a calcium concentration by determining a desired calcium mass balance for the patient over a complete dialysis cycle, calculating an intradialytic calcium mass balance, and adjusting the amount of the citrate to be introduced into the blood. The method can further include adjusting the amount of ionized calcium in the dialysate, and adjusting the amount of citrate in the dialysate.

This invention has many advantages, including potentially eliminating well-known downsides of heparin anticoagulation (such as heparin drug side effects, and increased bleeding risk), and addressing critical shortcomings of classic RCA. For example, since no separate calcium infusion may be required, there would be no need for a separate infusion pump, which would make RCA less costly and less laborious compared to current state of the art RCA. The frequent monitoring of systemic iCa and subsequent adjustments of the calcium infusion rate are also potentially rendered obsolete, which eliminates the potential for equipment failure and user error, resulting in improved patient safety.

BRIEF DESCRIPTION OF THE DRAWINGS

The foregoing will be apparent from the following more particular description of example embodiments of the invention, as illustrated in the accompanying drawings in which like reference characters refer to the same parts throughout the different views. The drawings are not necessarily to scale, emphasis instead being placed upon illustrating embodiments of the present invention.

FIG. 1 is a schematic diagram of an extracorporeal dialysis circuit employed in this invention.

FIG. 2 is a graph of a patient's ionized calcium concentration (left-hand scale) as a function of elapsed time during a dialysis treatment that included the modulations in citrate flow rate shown (right-hand scale).

FIG. 3A is a top-level overview of basic regional citrate anticoagulation model components of the invention and corresponding key calculations.

FIG. 3B is a flow chart of a computer implemented mathematical model of predicting a systemic ionized calcium concentration in the blood of the patient according to this invention.

FIG. 3C is a block diagram of a computer apparatus implementing methods of the present invention.

FIGS. 4A-D are graphs of predicted systemic iCa (mmol/L) as a function of measured systemic iCa and the corresponding Bland-Altman graphs.

FIGS. 5A-B are graphs of predicted systemic iCa (mmol/L) minus measured systemic iCa as a function of time (minutes) after start of hemodialysis for seventeen dialysis treatments on patients; FIG. 5A results are classified by tertiles of alkaline phosphatase (AP); FIG. 5B results are classified by tertiles of PTH concentration. The one treatment in the high AP and high PTH tertiles that does not cluster with the rest of the group was the one treatment using a dialysate with 2.5 mEq/L calcium concentration, as compared to 3.0 mEq/L for all other treatments.

FIG. 6 is a graph of predicted systemic iCa minus actual (measured) systemic iCa at the end of 17 hemodialysis treatments on patients comparing the prediction accuracy for the native model and two models employing multivariate linear regression (MLR1 and MLR2). Bold lines indicate the means for the models. The thin dashed line indicates zero difference between the predicted and measured end-dialysis systemic iCa.

FIG. 7 is a flow chart of predicting the post-dialysis systemic ionized calcium concentration for a patient employing a statistical correction based on the category of the PTH or AP level of the patient, dialysis treatment time, and the preliminary predicted post-dialysis concentration of systemic ionized calcium by the methods of the invention.

FIG. 8 is a graph of a hypothetical example of the slope of the relationship between the prediction error (preliminary predicted systemic iCa minus actual measured systemic iCa) and elapsed time of dialysis, which is used to estimate the expected prediction error for any time point during the treatment.

FIG. 9 is a flow chart of predicting the post-dialysis systemic ionized calcium concentration for a patient employing a statistical correction based on the category of the PTH or AP level of the patient and the preliminary predicted post-dialysis concentration of systemic ionized calcium by the methods of the invention.

FIG. 10 is a graph of predicted systemic iCa minus actual (measured) systemic iCa as a function of categories of elapsed treatment time during dialysis obtained by the model illustrated in FIG. 9.

DETAILED DESCRIPTION OF THE INVENTION

Turning to FIG. 1, in one embodiment, a method of performing regional citrate anticoagulant dialysis of a patient's blood includes flowing blood from and back to the patient through an extracorporeal circuit including a dialyzer 101 having semi-permeable dialysis membranes and a dialysate chamber surrounding the membranes. The semi-permeable dialysis membranes can be arranged in various configurations, such as, for example, bundles of hollow fibers made of a polymer, such as, for example, polysulfone. The blood flow rate through the extracorporeal dialysis circuit can be in a range of about 100 ml/min to about 1000 ml/min, preferably in a range of about 400 ml/min to about 500 ml/min.

The method further includes flowing a dialysate 120 containing calcium and citrate through the dialysate chamber of the dialyzer 101, preferably in a counter-current fashion. The amount of calcium contained in the dialysate 120 is sufficient to reduce the need for calcium to be added to the patient's blood downstream of the dialyzer, including eliminating the need for calcium to be added. A commercially available dialysate containing calcium and citrate is Citrasate® citrate dialysate. See U.S. Pat. No. 6,610,206 to Callanan et al. issued Aug. 26, 2003, and U.S. patent application Ser. No. 10/606,150 of Callanan et al. published as U.S. 2004/0060865 on Apr. 1, 2004.

The method further includes introducing citrate (at 103) into the patient's blood upstream of the dialyzer 101 in a sufficient amount to reduce clotting of the patient's blood in the extracorporeal dialysis circuit, whereby the patient's blood is dialyzed. The citrate 103 that is introduced into the patient's blood can be the same citrate that is present in the dialysate, or it can be a different citrate. Examples of citrates are sodium citrate and sodium isocitrate. See U.S. Pat. No. 6,368,785 to Ranby, issued Apr. 9, 2002. The citrate complexes with calcium, reducing the concentration of ionized calcium in the blood of the patient, preventing the blood from clotting. The target ionized calcium concentration pre-dialyzer (after citrate infusion) for traditional regional citrate anticoagulation is in a range of about 0.1 to about 0.4 mmol/L (0.2 to about 0.8 mEq/L). The methods described herein enable a higher concentration of ionized calcium, especially in combination with reduced heparin (e.g., about 50% of standard heparin dose), such as, for example, up to about 0.8 mmol/L (1.6 mEq/L). The dialysate 120 can contain citrate in a range of about 0.5 to about 5 mEq/L, preferably in a range of about 2 to about 4 mEq/L, and calcium in a range of about 1 to about 5 mEq/L, preferably in a range of about 2 to about 4 mEq/L. A commercially available suitable citrate solution has a sodium citrate concentration of about 0.136 M (4%).

The methods described herein are computer controlled with computational or mathematical modeling through one or more computer workstations 50 or a computer network, further made clear below. Briefly, computer 50 controls citrate infusion 103 and calcium infusion 105 based on detected (monitored) infusion profiles (described below), calculated citrate and calcium concentrations (pre- and post-dialyzer, after recirculation, etc.), blood flow rate, and dialysate flow rate as input to or otherwise obtained by computer 50. Turning to FIG. 2, in certain embodiments, the step of introducing the citrate includes time periods when the amount of citrate is modulated downwardly, alternating with time periods when the amount of citrate is modulated upwardly. A patient's serum (systemic) ionized calcium level drops during a dialysis treatment using regional citrate anticoagulation, but as shown in FIG. 2, it recovers quickly (e.g., within minutes) after significantly reducing the citrate introduction (infusion), depending on the patient's ionized calcium buffering capacity. This method can be used with patients whose systemic iCa levels tend to decline toward the safety threshold. In such cases, various forms of citrate infusion profiles can be employed, an example of which is shown in FIG. 2, to allow intermittent (partial) recovery of systemic iCa concentrations while still maintaining sufficient anticoagulation over the course of the treatment. Short interruptions of citrate infusion do not immediately lead to clotting of the extracorporeal circuit. Such profiles can take any particular form, including, for example, gradual changes with different slopes, or on-off patterns, or the pattern shown in FIG. 2, where the citrate flow rate is repeatedly modulated from about 425 ml/hr to about 100 ml/hr.

In these embodiments, the method can include the step of flushing the dialysis membranes, for example, during the time periods when the amount is modulated downwardly. Utilization of citrate profiles as described above provides improved systemic iCa stability, but may produce an increased risk of coagulation of the extracorporeal circuit during the low citrate infusion rate periods. Manual, or preferably automated flushes of the blood side of the extracorporeal circuit during those periods can be used to reduce this clotting risk. Such flushes can be used once or repeatedly. The dialysis membranes can be flushed with a liquid selected, for example, from the group consisting of bicarbonate containing dialysate, lactate containing dialysate, acetate containing dialysate, calcium containing dialysate, calcium and citrate containing dialysate, saline, dextrose solutions, and calcium containing solutions. In a preferred embodiment, a diverted stream of inlet dialysate can be used for flushing the blood side of the extracorporeal circuit. Alternatively, the flushing solution can come from a separate source. The flow rate of the flushing solution would be selected so as to not exceed permissible pressures in the extracorporeal circuit. One particular embodiment involves a reduction of the blood flow rate during the flushes in parallel with an increased flow rate of the flushing solution, so that the blood/flushing solution mixture is made up of a greater fraction of flushing solution, while still not exceeding permissible pressures in the extracorporeal circuit. A person skilled in the art of dialysis will recognize that the delivered flushing volume would need to be removed by ultrafiltration. Alternatively, the flushing procedure can involve temporarily bypassing the blood around the dialyzer, for example by using two four-way valves, and flushing the blood side of the dialyzer with a flushing solution without thereby diluting the blood of the patient.

In some embodiments, the step of introducing the citrate can be accompanied by the step of introducing heparin into the extracorporeal circuit. The heparin can be added either as a constant infusion in the arterial line, by using for example a pump, or by injection of an amount of heparin (a bolus) into the arterial line or the venous line of the extracorporeal circuit. The target amount of heparin to be introduced into the extracorporeal circuit can be less than about 1500 units, and preferably less than about 1000 units, which is substantially less than the 3000-5000 units typically used in a dialysis treatment, thereby reducing or eliminating the negative side effects of heparin, including reducing systemic anti-coagulation (i.e., anti-coagulation of the blood in the patient) during and post-dialysis, and yielding significant cost savings.

In another embodiment, the method can further include predicting the concentration of systemic ionized calcium in the blood of the patient. In some embodiments, predicting the concentration of systemic ionized calcium concentration in the blood of the patient is accomplished using a mathematical model, for example, the one illustrated in FIG. 3A, where the steps (sys, 1, 2, J, 3-5) are labeled to correspond to the labels shown in FIG. 1. Using a mathematical model can include employing citrate generation and metabolism to determine resulting citrate and calcium equilibria, determining citrate and calcium concentration changes caused by recirculation, determining a required pre-dialyzer citrate concentration and resulting citrate and calcium concentrations, determining a dialysate composition, determining diffusive and convective dialyzer fluxes, and determining post-dialyzer citrate and calcium concentrations. In some embodiments, the mathematical model is used to yield a preliminary predicted post-dialysis systemic ionized calcium concentration.

The method of predicting a concentration of systemic concentration of ionized calcium in the blood of the patient after dialysis is an extension of work done by Kozik-Jaromin. J. Kozik-Jaromin, Citrate kinetics during regional citrate anticoagulation in extracorporeal organ replacement therapy, Internal Medicine IV, Nephrology 2005. The seven main components of the method are schematically illustrated in FIGS. 1 and 3A, and described below.

Sys. Calculation of systemic citrate (Ci) generation, citrate metabolism, and resulting citrate and calcium equilibria.

a) Ci generation is calculated assuming an average generation rate of 240 mg/24 h.

b) Ci metabolism: C_Ci(t)=C₀·e^−k·twith k=0.0145 min−1

c) Solute equilibria (Ca⁺⁺, protein bound Ca, free Ci, CaCi complexes) are calculated assuming a mono-ionic milieu, using the following dissociation constants: K_CaCi(for CaCi complexes)=0.776 mmol/L; K_CaP(for Ca-protein binding)=11 mmol/L.

1. Calculation of citrate and calcium concentration changes caused by access recirculation.

2. Calculation of pre-dialyzer Ci concentration required to achieve target pre-dialyzer ionized calcium concentration:

a) Concentration of protein binding sites for calcium (C_B) according to protein concentration and 12 binding sites per molecule of albumin

b) C_CiT[−(C_Ca++)³−(C_Ca++)²·K_CaCi−(C_Ca++)²·K_CaP−(C_Ca++)²·C_B+(C_Ca++)²·C_CaT−C_Ca++·K_CaCi·K_CaP−K_CaCi·C_B+C_Ca++·K_CaCi·C_CaT+C_Ca++·K_CaP·C_CaT+K_CaCi·K_CaP·C_CaT]/[(C_Ca++)²+C_Ca++·K_CaP]

J. Calculation of diffusive and convective dialyzer solute fluxes, assuming KoA_Ca_—_free=603 mL/min; KoA_Ci_—_free=337 mL/min; KoA_CaCi=337 mL/min. See Kozik-Jaromin.

3. Calculation of post-dialyzer solute concentrations according to trans-membrane mass balances and solute distribution volume changes. Calculation of solute equilibria as in step 3, and C_Ci_—_free=C_Ci_—_total−C_CaCi.

4. Calculate solute concentrations post Ca substitution:

a) Total Ca, total Ci, Ca binding sites: self-evident (as per volume expansion)

b) Ca⁺⁺ and CaCi as per calculations in step 3

c) C_Ci_—_free=C_CiT−C_CaCi

5. Calculation of dialysate composition with respect to free Ci, Ca⁺⁺, CaCi complexes:

$a) C_{Ci_free} = - 0.5 \cdot \sqrt{0.5 \cdot {(C_{CaT} - C_{CiT} + K_{CaCi})}^{2} + K_{CaCi} \cdot C_{CiT}} b) C_{Ca_free} = C_{CaT} OR \frac{K_{CaCi} \cdot (C_{CiT} - C_{Ci_free})}{C_{Ci_free}} (if citrate - containing dialysate) c) C_{CaCi} = \frac{C_{Ca_free} \cdot C_{Ci_free}}{K_{CaCi}}$

In another embodiment, a method of modeling a concentration of citrate and calcium and dialyzing blood of a patient can include the computer implemented steps of determining a blood flow rate from and back to the patient through an extracorporeal dialysis circuit including a dialyzer having semi-permeable dialysis membranes and a dialysate chamber surrounding the membranes, and determining a flow rate through the dialysate chamber of the dialyzer of a dialysate that includes a predetermined amount of calcium and a predetermined amount of citrate, and computing an amount of citrate to be introduced into the blood, upstream of the dialyzer, such that ionized calcium is reduced upstream of the dialyzer to a concentration that is sufficiently small to reduce clotting of the flowing blood. In one embodiment, the method can include the step of computing the concentration of ionized calcium in the blood of a patient. In another embodiment, the method can include the step of computing the concentration of citrate in the blood of the patient. A flow chart of the computer-implemented modeling method is illustrated in FIG. 3B.

As shown in FIG. 3B, the entire hemodialysis (HD) treatment is modeled iteratively by performing these calculations for consecutive intervals of user-definable (ideally close to infinitesimal) duration.

The distribution volume for calcium and citrate is assumed to be extracellular water, which was approximated in liters as the sum of one third of the urea distribution volume in liters (derived from formal urea kinetic modeling) and the patient's current interdialytic weight gain in kilograms. Urea distribution volume can alternatively be assessed by means of tracer dilution assay, bioelectrical impedance analysis or anthropometric equations.

For each iteration, the amount of total calcium in the extracellular fluid volume (calculated as the product of its concentration and its distribution volume, i.e., extracellular fluid volume) is corrected to reflect the respective trans-membrane calcium mass transfer (in all considered chemical forms, and including both diffusive and convective transfer). The resulting total calcium amount in the extracellular fluid volume is then divided by the calcium distribution volume (i.e., extracellular fluid volume) at the end of the interval (taking into account ultrafiltration) to arrive at the systemic total calcium concentration at the end of the interval. An analogous process is followed for citrate and protein concentrations. The systemic ionized calcium concentration is then determined by rearranging the equation in step 2b to solve for ionized calcium concentration (which yields a cubic equation in the normal form) and then solving this cubic equation either iteratively or numerically.

A description of the program code is provided in Tables I and II. The nomenclature for variables used in the program code is as follows: “_sys,” “_loc1,” “_loc2,” “_loc3,” “_loc4,” and “_loc5” denote the location along the extracorporeal circuit (points sys, 1-5 shown in FIG. 1), and “_beg,” and “_end” denote the beginning and end of an iteration interval, respectively. There are three simulation modes: simulation mode 1 (sim1) uses a target pre-filter ionized calcium concentration, then keeps the citrate infusion rate fixed; simulation mode 2 (sim2) uses a target pre-filter ionized calcium concentration, then keeps the pre-filter ionized calcium concentration fixed; and simulation mode 3 (sim3) uses a specified citrate infusion rate profile.

One or more computers 50 execute the program code and may be of a variety of computer architectures such as client-server, standalone processor, networked or distributed processor. FIG. 3C is a diagram of the internal structure of a computer 50 in a computer network or other computer based environment in which the present invention can be implemented. Each computer 50 contains system bus 79, where a bus is a set of hardware lines used for data transfer among the components of a computer or processing system. Bus 79 is essentially a shared conduit that connects different elements of a computer system (e.g., processor, disk storage, memory, input/output ports, network ports, etc.) that enables the transfer of information between the elements. Attached to system bus 79 is I/O device interface 82 for connecting various input and output devices (e.g., keyboard, mouse, displays, printers, speakers, etc.) to the computer 50. Network interface 86 allows the computer to connect to various other devices attached to a network (e.g., global computer network, local area network, wide area network, and the like). Memory 90 provides volatile storage for computer software instructions 92 and data 94 used to implement an embodiment of the present invention (e.g., the mathematical model, process of predicting the concentration of systemic ionized calcium in the blood of the patient, statistical corrector of the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood, and supporting code detailed above, below, and in Tables I and II). Disk storage 95 provides non-volatile storage for computer software instructions 92 and data 94 used to implement an embodiment of the present invention. Central processor unit 84 is also attached to system bus 79 and provides for the execution of computer instructions.

In one embodiment, the processor routines 92 and data 94 are a computer program product (generally referenced 92), including a computer readable medium (e.g., a removable storage medium such as one or more DVD-ROM's, CD-ROM's, diskettes, tapes, etc.) that provides at least a portion of the software instructions for the invention system. Computer program product 92 can be installed by any suitable software installation procedure, as is well known in the art. In another embodiment, at least a portion of the software instructions may also be downloaded over a cable, communication and/or wireless connection. In other embodiments, the invention programs are a computer program propagated signal product embodied on a propagated signal on a propagation medium (e.g., a radio wave, an infrared wave, a laser wave, a sound wave, or an electrical wave propagated over a global network such as the Internet, or other network(s)). Such carrier medium or signals provide at least a portion of the software instructions for the present invention routines/program 92.

In alternate embodiments, the propagated signal is an analog carrier wave or digital signal carried on the propagated medium. For example, the propagated signal may be a digitized signal propagated over a global network (e.g., the Internet), a telecommunications network, or other network. In one embodiment, the propagated signal is a signal that is transmitted over the propagation medium over a period of time, such as the instructions for a software application sent in packets over a network over a period of milliseconds, seconds, minutes, or longer. In another embodiment, the computer readable medium of computer program product 92 is a propagation medium that the computer system 50 may receive and read, such as by receiving the propagation medium and identifying a propagated signal embodied in the propagation medium, as described above for computer program propagated signal product.

Generally speaking, the term “carrier medium” or transient carrier encompasses the foregoing transient signals, propagated signals, propagated medium, storage medium and the like.

Prediction Results

Seventeen hemodialysis treatments were conducted on 8 maintenance HD patients using citrate bicarbonate dialysate (Citrasate® dialysate, Advanced Renal Technologies, Bellevue, Wash.; 3 mEq/L calcium, 2.4 mEq/L citrate). For one treatment only, Citrasate with 2.5 mEq/L Ca was used. No post-dialyzer Ca infusion was performed. Total Ca, Ca⁺⁺ and total Ci were measured systemically, pre- and post-dialyzer at the following time points: before HD (systemically only), at several time points throughout the treatment, and at the end of HD. The measurements of systemic Ca, Ca⁺⁺ and total Ci were taken from the arterial line, upstream of the citrate infusion port while the blood flow rate was reduced to about 50 mL/min. Total protein and albumin were measured before dialysis. The most recent alkaline phosphatase (AP) and total parathyroid hormone (PTH) (Scantibodies assay, Scantibodies Laboratory, Inc., Santee, Calif.) were recorded. Trisodium citrate (136 mmol/L; 4%) was infused into the arterial line at various rates to result in pre-dialyzer Ca values of approx. 0.25 to 0.65 mmol/L. Blood flow rate was 350 mL/min in 4 treatments and 400 mL/min in 13 treatments; the dialysate flow rate was fixed at 500 mL/min. All subjects used Optiflux F180NR dialyzers (Fresenius Medical Care North America, Waltham, Mass.).

Measured and predicted systemic Ca⁺⁺ were compared pre-HD and at 15 min into the treatment. For the latter, pre-HD predicted were adjusted to measured values. Pre- and post-dialyzer comparisons between measured and estimated Ca⁺⁺ were performed at 15 min into the treatment. Deviations between predicted and measured systemic Ca⁺⁺ over the entire treatment were compared for tertiles of AP and tPTH.

Results are presented below as mean±standard deviation (SD) unless otherwise noted. Differences between predicted and measured values were calculated as predicted minus measured and were tested for significant deviation from zero by means of two-tailed one-sample t test. Bland-Altman plots were generated and the underlying data analyzed for systematic bias by means of linear regression. Statistical significance was accepted for an alpha level of <0.05.

The study cohort consisted of 8 subjects (age 63±13.6 years, 4 males). Measured and predicted systemic Ca⁺⁺ [mmol/L] at baseline (pre-HD) was 1.08±0.06 and 1.05±0.05, respectively (difference −0.03±0.046, 95% CI −0.055 to −0.007; FIG. 4A), and at 15 min into the treatment 1.01±0.05 and 1.02±0.05, respectively (difference 0.012±0.054, 95% CI −0.015 to 0.4; FIG. 4B). At 15 min, the measured and predicted pre-dialyzer Ca was 0.33±0.06 and 0.39±0.05, respectively (difference 0.06±0.03, 95% CI 0.044 to 0.077; FIG. 4C). At the same time point, corresponding post-dialyzer Ca was 0.7±0.05 and 0.61±0.05, respectively (difference −0.09±0.04, 95% CI −0.11 to −0.07; FIG. 4D). Neither visual inspection of Bland-Altman plots nor formal analysis of the underlying data revealed any systematic bias in any of these predictions.

The tertile ranges for AP were 85 to 106 U/L (low AP), 112 to 143 U/L (medium AP), and 154 to 592 U/L (high AP). For PTH, the tertile ranges were 258 to 627 pg/mL (low PTH), 636 to 856 pg/mL (medium PTH), and 916 to 1287 pg/mL (high PTH). FIG. 5 shows the difference between predicted and measured systemic Ca⁺⁺ plotted against treatment time. FIG. 5A is stratified by AP tertiles; FIG. 5B is stratified by PTH tertiles. While the curves for the low and medium tertiles show no clear separation, the curves corresponding to the high AP tertile as well as the high tPTH tertile cluster toward the bottom of the plots, indicating that the most pronounced differences between predicted and measured values occur in these tertiles.

Multiple Linear Regression Model

Additionally, the method can further include statistically correcting the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood to provide a final predicted post-dialysis systemic ionized calcium concentration. Statistically correcting the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood can include classifying the patient's parathyroid hormone (PTH) level or alkaline phosphatase (AP) level into at least two categories of PTH or AP levels based on concentration, and estimating a difference between the preliminary predicted and the actual post-dialysis concentration of systemic ionized calcium in the patient's blood based on the category of the PTH or AP level of the patient, dialysis treatment time, and the preliminary predicted post-dialysis concentration of systemic ionized calcium, thereby obtaining a correction to the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood. The difference between the preliminary predicted and actual post-dialysis concentration of systemic ionized calcium in the patient's blood can be determined by employing a multivariate linear regression model including the category of the PTH or AP level of the patient, dialysis treatment time, and the preliminary predicted concentration of systemic ionized calcium in the patient's blood. The PTH or the AP level in the patient's blood can be classified into categories, for example, tertiles, quartiles, quintiles, etc.

The predicted results discussed above (denoted as preliminary predicted results in this section) in a cohort of 8 patients (17 treatments) demonstrated an underestimation of post-dialysis systemic iCa in the range of 0.03 to 0.29 mmol/L (average 0.15 mmol/L, 95% confidence interval, CI, 0.11 to 0.20 mmol/L). Furthermore, it was shown above that the accuracy of prediction relates to the individual subject's parathyroid hormone (PTH) and alkaline phosphatase (AP) levels. Without wishing to be bound to any particular theory, it is believed that these levels are surrogate markers of bone turnover and, hence, calcium buffering capacity. It will be shown below that the difference between end-dialysis systemic iCa estimated by the method described above and the measured end-dialysis systemic iCa also relates to the duration of the hemodialysis treatment and to the predicted post-dialysis systemic iCa.

Determining a model concentration of systemic ionized calcium in the patient's blood after dialysis includes employing a statistical multivariate linear regression model to determine the difference (ΔiCa_pred_—_MLR) between the predicted end-dialysis systemic iCa obtained by the method described above (iCa_pred_—_RCA), and the actual, measured, end-dialysis systemic iCa (iCa_actual). This difference, ΔiCa_pred_—_MLR, can then be used to correct the estimated value and yield an accurate model end-dialysis systemic iCa prediction (iCa_pred_—_hybrid). The mathematical relationships used in applying the model are as follows:

ΔiCa_pred_—_MLR=iCa_pred_—_RCA−iCa_actual (i)

iCa_pred_—_hybrid=iCa_pred_—_RCA−ΔiCa_pred_—_MLR (ii)

The multivariate regression model can use as many parameters as can be validated to predict the difference between the estimated systemic iCa (iCa_pred_—_RCA) and the actual iCa (iCa_actual). This number of predictors is likely to increase as the number of available data points for model generation increases, and can comprise any variables that can be shown to relate to the prediction accuracy of the estimation method described above, including (without limitation) PTH level, AP level, the duration of the hemodialysis treatment, the subject's age, race, gender, average citrate infusion rate, urea distribution volume, extracellular fluid volume, pre-dialysis total or ionized calcium, phosphate binder therapy, cinacalcet medication, vitamin D or VDRA therapy, serum phosphorus, serum albumin, hematocrit, blood flow rate, and the predicted iCa result itself. As described below, preferred variables are, first, the set of PTH level, hemodialysis treatment time, and the predicted iCa result, and, second, the set of AP level, hemodialysis treatment time, and the predicted iCa result. Continuous parameters may be entered as scale variables or in categorized form, that is, classified into categories of increasing amounts of a variable. The number of categories can be at least two categories, such as, for example, tertiles, quartiles, or quintiles.

Results of Multiple Linear Regression Model

The following analyses were performed in a cohort of 8 subjects (17 treatments). ΔiCa_pred_—_RCAdenotes the difference between the end-dialysis iCa as predicted by the method described above and the actual (measured) end-dialysis iCa, with

ΔiCa_pred_—_RCA=iCa_pred_—_RCA−iCa_actual (iii)

Bi-variate correlation analysis revealed associations between ΔiCa pred_—_RCAand tertiles of PTH (PTH_tertile), tertiles of AP (AP_tertile), duration of hemodialysis treatment (t_d), and iCa_pred_—_RCA(as shown below in Table 1; all significant, except borderline significance for PTH tertiles).

TABLE 1

Bivariate correlations for variables used in

subsequent multivariate model construction

PTH_tertile
AP_tertile
td
iCa_pred_—_RCA

ΔiCa_pred_—_RCA
Pearson
−0.412
−.514(*)
−.656(**)
.828(**)

Correlation

Sig. (2-tailed)
0.100
0.035
0.004
0.000

N
17
17
17
17

*Correlation is significant at the 0.05 level (2-tailed).

**Correlation is significant at the 0.01 level (2-tailed).

A multiple linear regression model (MLR1) was fitted with ΔiCa_pred_—_RCAas the dependent variable and PTH_tertile, t_d, and iCa_pred_—_RCAas predictors. Tables 2 and 3 below show the respective model statistics.

TABLE 2

Analysis of variance (ANOVA) for model MLR1 ^{(a), (b)}

Sum of

Mean

Model

Squares
df
Square
F
Sig.

MLR1
Regression
0.082
3
0.027
11.880
.001

Residual
0.030
13
0.002

Total
0.112
16

^(a)Predictors: (Constant), PTH_tertile, td, iCa_pred_—_RCA

^(b)Dependent Variable: ΔiCa_pred_—_RCA

TABLE 3

Model coefficients for model MLR1 (Dependent variable: ΔiCa_pred_—_RCA)

Unstandardized
Standardized

Coefficients
Coefficients

Model
B
Std. Error
Beta
t
Sig.

MLR1
(Constant)
−0.5861999002
0.171

−3.433
0.004

td
−0.0003737443
0.000
−0.277
−1.509
0.155

iCa_pred_—_RCA
0.5895283578
0.157
0.689
3.751
0.002

PTH_tertile
0.0047472376
0.017
0.047
0.277
0.786

As an example of the use of model coefficients for a given patient, ΔiCa_pred_—_RCAcan be obtained from the coefficients in Table 3 by

ΔiCa_pred_—_RCA=−0.5861999002−0.0003737443*td+0.5895283578*iCa_pred_—_RCA++0.0047472376*PTH_tertile (Example)

where the patient's treatment time, RCA model prediction of systemic ionized calcium, and PTH tertile are substituted into the equation to yield the correction term for the patient. The coefficients are subject to change for example, for a larger set of patient data, or a different number of categories of PTH levels.

Another multiple linear regression model (MLR2) was fitted with ΔiCa_pred_—_RCAas the dependent variable and AP_tertile, t_d, and iCa_pred_—_RCAas predictors. Tables 4 and 5 show the respective model statistics.

TABLE 4

Analysis of variance (ANOVA) for model MLR2 ^{(a), (b)}

Sum of

Mean

Model

Squares
df
Square
F
Sig.

MLR2
Regression
0.082
3
0.027
11.806
.001

Residual
0.030
13
0.002

Total
0.112
16

^(a)Predictors: (Constant), AP_tertile, td, iCa_pred_—_RCA

^(b)Dependent Variable: ΔiCa_pred_—_RCA

TABLE 5

Model coefficients for model MLR2 (Dependent Variable: ΔiCa_pred_—_RCA)

Unstandardized
Standardized

Coefficients
Coefficients

Model
B
Std. Error
Beta
t
Sig.

1
(Constant)
−0.5613273965
0.176

−3.192
0.007

TIME
−0.0003456055
0.000
−0.256
−1.386
0.189

iCa_{pred RCA}
0.5700463766
0.161
0.666
3.536
0.004

AP_tertile
−0.0023451955
0.018
−0.023
−0.130
0.899

These regression models were used (separately) to estimate the difference (ΔiCa_pred_—_MLR) between the predicted end-dialysis systemic iCa (iCa_pred_—_RCA) and the actual (measured) end-dialysis systemic iCa (iCa_actual). ΔiCa_pred_—_MLRwas then used for simple additive correction of iCa_pred_—_RCAto yield the final corrected end-dialysis systemic iCa model prediction (iCa_pred_—_hybrid). Equation (ii) applies accordingly.

FIG. 6 shows a comparison of the post-dialysis systemic iCa prediction accuracy of the method described above and the two described realizations of the new model (MLR1 and MLR2, respectively). As shown in FIG. 6, the prediction using the method described above yields an underestimation of actual iCa in the range of 0.03 to 0.29 mmol/L with an average ΔiCa_pred_—_RCAof −0.15 mmol/L (95% confidence interval, CI, −0.20 to −0.11 mmol/L). In contrast, when either of the models is used (MLR1 or MLR2), there is on average no difference between the model prediction and the measured iCa (for both models: ΔiCa_pred_—_hybrid=−0.0006 mmol/L, 95% CI −0.023 to 0.022 mmol/L; not significantly different from zero, P=0.96, one sample t test). Therefore, the described model significantly improves the prediction of end-dialysis systemic iCa in regional citrate anticoagulation.

FIG. 7 shows a flow chart for predicting post-dialysis systemic ionized calcium concentration for a patient using the methods described above.

In another embodiment, the method can further include statistically correcting the preliminary predicted concentration of systemic ionized calcium in the patient's blood at any time point during dialysis to provide a final predicted systemic ionized calcium concentration for that time point. Statistically correcting the preliminary predicted concentration of systemic ionized calcium in the patient's blood at any time point during dialysis can include classifying the patient's parathyroid hormone (PTH) level or alkaline phosphatase (AP) level into at least two categories of PTH or AP levels based on concentration, and estimating a slope (“prediction error slope”) of the relationship between the prediction error of the preliminary systemic ionized calcium concentration in the patient's blood and the elapsed time of dialysis, based on the category of the PTH or AP level of the patient and the preliminary predicted post-dialysis concentration of systemic ionized calcium. The prediction error slope can be determined by employing a multivariate linear regression model including the category of the PTH or AP level of the patient and the preliminary predicted post-dialysis concentration of systemic ionized calcium in the patient's blood as independent variables. The PTH or the AP level in the patient's blood can be classified into categories, for example, tertiles, quartiles, quintiles, etc.

Determining a model concentration of systemic ionized calcium in the patient's blood at any given time point during dialysis includes employing a statistical multivariate linear regression model to determine this prediction error slope and multiplying it by the elapsed time of dialysis at the time point of interest, thereby obtaining an estimated prediction error for the preliminary predicted systemic ionized calcium concentration in the patient's blood at that time point (illustrated in FIG. 8). This estimated prediction error can then be used to correct the preliminary estimated value and yield an accurate model systemic ionized calcium prediction for that time point (see FIG. 9 for a flowchart of this process).

As was shown above in FIGS. 5A and 5B, the relationship between the prediction error of the preliminary ionized calcium concentration in the patient's blood and the elapsed time of dialysis is near-linear. The following analyses were performed in a cohort of 8 subjects (17 treatments). For each treatment, a linear regression slope was calculated for the relationship between the prediction error of the preliminary systemic ionized calcium concentration in the patient's blood and the elapsed time of dialysis (hereafter referred to as “slope”), and the preliminary predicted post-dialysis systemic ionized calcium concentration in the patients' blood was obtained. PTH values for all treatments were categorized into tertiles. A multiple linear regression (MLR) model was constructed using slope as dependent variable and preliminary predicted post-dialysis systemic iCa concentration and PTH category as independent variables. The MLR model yielded an overall significance level of P=0.018, as shown in Table 6, along with the overall model statistics for multiple linear regression model using prediction error slope as dependent variable and tPTH tertiles and preliminary predicted end-dialysis systemic ionized calcium concentration as independent variables.

TABLE 6

Overall model statistics for MLR model using

tPTH tertile and RCA model prediction

Sum of

Model

Squares
df
Mean Square
F
Sig.

1
Regression
.000
2
.000
5.474
.018(a)

Residual
.000
14
.000

Total
.000
16

(a)Predictors: (Constant), ICA_PRED, TPTH_3TI

b Dependent Variable: SLOPE

The parameter estimates are given in Table 7. The linear equation derived for slope estimation was found to be:

slope=−0.0025726570+8.86644·10⁻⁵·tPTH tertile+0.0018663110··preliminary systemic end-dialysis ionized calcium prediction (A)

Table 7 shows the parameter estimates from multiple linear regression model using prediction error slope as dependent variable and tPTH tertiles (“TPTH_—3TI”) and preliminary predicted end-dialysis systemic ionized calcium concentration (“ICA_PRED”) as independent variables.

TABLE 7

Parameter estimates for MLR model using tPTH and RCA model prediction

Unstandardized
Standardized

Coefficients
Coefficients

Model

B
Std. Error
Beta
t
Sig.

1
(Constant)
−.0025726570
.001

−4.633
.000

TPTH_3TI
8.866440543E−05
.000
.302
1.325
.206

ICA_PRED
.0018663110
.001
.751
3.297
.005

a Dependent Variable: SLOPE

Slopes for each treatment were estimated using Eq. A and used to correct the preliminary predicted systemic ionized calcium concentration in the patients' blood for multiple time points during the treatments. From these corrected predictions, the actual measured values for these time points were subtracted to obtain the actual final prediction error, which is shown in FIG. 10. FIG. 10 is an illustration of the prediction error obtained using the slope hybrid model (model-predicted systemic ionized calcium concentration minus actual measured systemic ionized calcium concentration) as a function of categories of elapsed treatment time. As can be seen, the systemic ionized calcium concentration in the patients' blood can be estimated with this slope hybrid model within an error margin of about ±0.1 mmol/L, and this error margin remains stable throughout the entire treatment.

In some embodiments, the method can be employed during dialysis treatment of a patient and include the steps of maintaining or adjusting the patient's intradialytic calcium mass balance to desired levels relative to the patient's interdialytic intakes of calcium during a time in which the patient is undergoing dialysis treatment using a dialyzer that includes a dialysate containing a calcium concentration by determining a desired intradialytic calcium mass balance for the patient over a complete dialysis cycle, calculating an intradialytic calcium mass balance, and adjusting the amount of the citrate to be introduced into the blood. In these embodiments, the method can include the step of adjusting the amount of ionized calcium in the dialysate, as described in application Ser. No. 12/580,803, filed on Oct. 16, 2009, and optionally can include the step of adjusting the amount of citrate in the dialysate.

In yet another embodiment, the computer implemented method of modeling can be used to compute the effects of varying degrees of dialyzer clotting (impairment) on citrate and calcium profiles and mass balances. The method of modeling a concentration of citrate and calcium in dialyzing blood of a patient includes the computer implemented steps of determining a blood flow rate from and back to the patient through an extracorporeal dialysis circuit including a dialyzer having semi-permeable dialysis membranes and a dialysate chamber surrounding the membranes, determining a flow rate through the dialysate chamber of the dialyzer of a dialysate that includes a predetermined amount of calcium and a predetermined amount of citrate, and computing an amount of citrate anticoagulant to be introduced into the blood, upstream of the dialyzer, such that ionized calcium is reduced upstream of the dialyzer to a concentration that is sufficiently small to reduce clotting of the flowing blood. The method can further include computing a serum concentration of ionized calcium in the blood of the patient, and computing a concentration of citrate in the blood of the patient. In some embodiments, computing the amount of citrate anticoagulant to be introduced includes computationally determining for a given patient certain time periods when the amount of citrate is to be modulated downwardly, and alternating time periods when the amount of citrate is to be modulated upwardly. In certain embodiments, the method is employed during dialysis treatment of a patient.

In still another embodiment, the computer implemented method of modeling can be used to dynamically adjust the citrate flow rate and blood flow rate in order to react to venous pressure changes or hypotensive episodes of the patient, while maintaining a desired pre-dialyzer iCa level.

TABLE I

Explanation of variables used in program code excerpt

RANGES FOR INPUT PARAMETERS

rng_Ci_infusion
Worksheet range for citrate infusion rate profile

rng_Ca_infusion
Worksheet range for calcium infusion rate profile

rng_UFR
Worksheet range for ultrafiltration rate profile

rng_C_Ci_infusion
Worksheet range for concentration of citrate infusion

rng_C_Ca_infusion
Worksheet range for concentration of calcium infusion

rng_Qb
Worksheet range for blood flow rate

rng_Qd
Worksheet range for dialysate flow rate

rng_recirc_access
Worksheet range for access recirculation

rng_Vurea
Worksheet range for Urea distribution volume

rng_td
Worksheet range for dialysis treatment time

rng_tpost
Worksheet range for duration of post-dialysis period to be modeled

rng_C_CaT_loc5
Worksheet range for dialysate inlet total calcium concentration

rng_C_CiT_loc5
Worksheet range for dialysate inlet total citrate concentration

rng_wtgain
Worksheet range for current interdialytic weight gain

rng_KMP
Worksheet range for miscible calcium pool buffer coefficient

rng_Hct_sys
Worksheet range for systemic hematocrit

rng_C_CiT_sys_beg
Worksheet range for systemic total citrate concentration

rng_C_CaT_sys_beg
Worksheet range for systemic total calcium concentration

rng_C_prot_sys_beg
Worksheet range for systemic protein concentration

rng_C_Cafree_loc2
Worksheet range for pre-filter ionized calcium

rng_sel_sim_mode
Worksheet range for specifying the desired simulation mode

RANGES FOR INTERNAL PARAMETERS

rng_gs_iCa
Worksheet range for goal seek cell: iCa concentration

rng_gs_K_CaCi
Worksheet range for goal seek cell: CaCi dissociation constant

rng_gs_K_CaP
Worksheet range for goal seek cell: CaP dissociation constant

rng_gs_C_CiT
Worksheet range for goal seek cell: total citrate concentration

rng_gs_C_bindingsites
Worksheet range for goal seek cell: concentration of Ca binding sites

rng_gs_C_CaT
Worksheet range for goal seek cell: total calcium concentration

rng_gs_cubic
Worksheet range for goal seek cell: cubic equation

RANGES FOR CONTROL PANEL PARAM.

rng_sel_skip_Ci_infusion_iteration
Worksheet range for switch indicating whether or not to skip

iterative process to determine the accurate citrate infusion rate

rng_K_CaCi
Worksheet range for calcium-citrate complex dissociation constant

rng_K_CaP
Worksheet range for calcium-protein dissociation constant

rng_KoA_CaCi
Worksheet range for mass transfer area coefficient for CaCi

rng_KoA_Cifree
Worksheet range for mass transfer area coefficient for free citrate

rng_KoA_Cafree
Worksheet range for mass transfer area coefficient for free calcium

rng_k_Ci
Worksheet range for metabolic rate constant for citrate

rng_Rate_G_Ci
Worksheet range for citrate generation rate

rng_interval_intra
Worksheet range for duration of intradialytic iteration interval

rng_interval_post
Worksheet range for duration of postdialytic iteration interval

rng_reduction_step
Worksheet range for magnitude of reductions in citrate infusion rate

during iterative process to find accurate infusion rate

rng_sel_use_iCa_tolerance
Worksheet range for switch indicating whether or not to allow for

iCa tolerance when iterating to find accurate citrate infusion rate

rng_tolerance_Cafree_loc2
Worksheet range for magnitude of iCa tolerance when iterating to

find accurate citrate infusion rate

INPUT VARIABLES FROM CONTROL

PANEL (switches, selections, constants)

sel_skip_Ci_infusion_iteration
Switch that determines whether or not to skip the iterative process

determining the accurate citrate infusion rate required to reach the

pre-filter iCa target

sel_sim_mode
Simulation mode

reduction_step
Magnitude of reductions in citrate infusion rate during iterative

process to find accurate infusion rate

sel_use_iCa_tolerance
Switch indicating whether or not to allow for iCa tolerance when

iterating to find accurate citrate infusion rate

tolerance_Cafree_loc2
Magnitude of iCa tolerance when iterating to find accurate citrate

infusion rate

K_CaCi
Calcium-citrate complex dissociation constant [mmol/L] (e.g., 0.776 mmol/L)

K_CaP
Calcium-protein dissociation constant [mmol/L] (e.g., 11 mmol/L)

KoA_CaCi
Dialyzer mass transfer area coefficient for CaCi [L/min] (e.g., 0.337 L/min)

KoA_Cifree
Dialyzer mass transfer area coefficient for free citrate [L/min] (e.g.,

0.337 L/min)

KoA_Cafree
Dialyzer mass transfer area coefficient for free calcium [L/min] (e.g.,

0.603 L/min)

k_Ci
Metabolic rate constant for citrate [min⁻¹] (e.g., 0.0145 min⁻¹)

Rate_G_Ci
Citrate generation rate [mg/24 h] (e.g., 240 mg/24 h)

INPUT VARIABLES FROM USER

INTERFACE

C_Ci_infusion
Concentration of citrate infusion [mmol/L] (e.g., 136 to 1600 mmol/L)

C_Ca_infusion
Concentration of calcium infusion [mmol/L] (e.g., 500 mmol/L)

Qb
Blood flow rate [L/min] (e.g., 0.2 to 0.5 L/min]

Hct_sys( )
Systemic hematocrit at beginning of interval [vol-%/100] (e.g., 0.25

to 0.5)

Qd
Dialysate flow rate [L/min] (e.g., 0.4 to 0.8 L/min)

recirc_access
Access recirculation [%/100] (e.g., 0.05 to 0.2)

UFR( )
Ultrafiltration rate [L/min] (e.g., 0.005 to 0.02 L/min)

Vurea
Urea distribution volume [L] (e.g., 25 to 70 L)

td
Dialysis treatment time [min] (e.g., 150 to 300 min)

tpost
Post-dialysis observation time to be modeled [min] (e.g., 60 to 300 min)

C_CaT_loc5
Dialysate inlet total calcium concentration [mmol/L] (e.g., 0 to 2 mmol/L)

C_CiT_loc5
Dialysate inlet total citrate concentration [mmol/L] (e.g., 0 to 2 mmol/L)

interval
Interval length (generic; used for all code and set to either

interval_intra or interval_post, as applicable) [min]

interval_intra
Interval length for intradialytic iterations [min] (e.g., 0.017 to 1 min)

interval_post
Interval length for postdialytic iterations [min] (e.g. 1 min)

run_in
Interval length for run-in iteration [min] (e.g., 1.66 * 10⁻⁵min)

wtgain
Current interdialytic weight gain [kg] (e.g., 0.5 to 5 kg)

KMP
Miscible calcium pool buffer coefficient [dimensionless] (e.g., 0.55 to

0.85)

VARIABLES FOR MODELING PROCESS

Qb_sys( )
“Systemic” blood flow rate [L/min]

Qb_loc1( )
Blood flow rate at location 1 [L/min]

Qb_loc2( )
Blood flow rate at location 2 [L/min]

Qb_loc3( )
Blood flow rate at location 3 [L/min]

Qb_loc4( )
Blood flow rate at location 4 [L/min]

R_p_wb_sys( )
Ratio of plasma to whole blood systemically [dimensionless]

R_pw_wb_sys( )
Ratio of plasma water to whole blood systemically [dimensionless]

R_p_wb_loc1( )
Ratio of plasma to whole blood at location 1 [dimensionless]

R_pw_wb_loc1( )
Ratio of plasma water to whole blood at location 1 [dimensionless]

R_p_wb_loc4( )
Ratio of plasma to whole blood at location 4 [dimensionless]

R_pw_wb_loc4( )
Ratio of plasma water to whole blood at location 4 [dimensionless]

C_CaT_sys_beg_wb( )
Theoretical whole blood concentration of total calcium systemically

at beginning of interval [mmol/L]

C_CiT_sys_beg_wb( )
Theoretical whole blood concentration of total citrate systemically at

beginning of interval [mmol/L]

C_prot_sys_beg_wb( )
Theoretical whole blood concentration of total protein systemically

at beginning of interval [mmol/L]

C_CaT_loc1_wb( )
Theoretical whole blood concentration of total calcium at location 1

[mmol/L]

C_CiT_loc1_wb( )
Theoretical whole blood concentration of total citrate at location 1

[mmol/L]

C_prot_loc1_wb( )
Theoretical whole blood concentration of total protein at location 1

[mmol/L]

C_CaT_loc4_wb( )
Theoretical whole blood concentration of total calcium at location 4

[mmol/L]

C_CiT_loc4_wb( )
Theoretical whole blood concentration of total citrate at location 4

[mmol/L]

C_prot_loc4_wb( )
Theoretical whole blood concentration of total protein at location 4

[mmol/L]

gs_iCa_default_sys
Goal seek iCa default for systemic iCa [mmol/L] (e.g., 1.5 mmol/L)

gs_iCa_default_loc2
Goal seek iCa default for iCa at location 2 [mmol/L] (e.g., 0.05 or

1.5 mmol/L)

gs_iCa_default_loc3
Goal seek iCa default for iCa at location 3 [mmol/L] (e.g., 0.4 or 1.5 mmol/L)

gs_iCa_default_loc4
Goal seek iCa default for iCa at location 4 [mmol/L] (e.g., 1.5 mmol/L)

c
Iteration counter

req_iterations_HD
Required intradialytic iterations

req_iterations_post
Required postdialytic iterations

req_iterations
Required iterations for entire modeling process

reduction
Auxiliary variable used when iterating to determine the accurate

citrate infusion rate required to reach the pre-filter iCa target

[L/min]

dilution
Auxiliary variable used when iterating to determine the accurate

citrate infusion rate required to reach the pre-filter iCa target

[dimensionless]

actual_C_Cafree
Auxiliary variable used when iterating to determine the accurate

citrate infusion rate required to reach the pre-filter iCa target. No

location (_loc) is specified, so that this variable can be used for

different locations (this is a temporary variable) [mmol/L]

actual_C_CiT
Auxiliary variable used when iterating to determine the accurate

citrate infusion rate required to reach the pre-filter iCa target. No

location (_loc) is specified, so that this variable can be used for

different locations (this is a temporary variable) [mmol/L]

cf_Ca_mmol_to_mg
Conversion factor: calcium from mmol to mg [dimensionless]

time( )
Elapsed time since start of hemodialysis treatment [min]

C_prot_sys_beg( )
Total serum protein concentration systemically at beginning of

interval [g/L] (e.g., 60 to 85 g/L)

C_prot_loc1( )
Protein concentration at location 1 [g/L]

C_prot_loc4( )
Protein concentration at location 4 [g/L]

C_bindingsites_sys_beg( )
Concentration of calcium binding sites systemically at beginning of

interval [mmol/L]

C_bindingsites_loc1( )
Concentration of calcium binding sites at location 1 [mmol/L]

C_bindingsites_loc2( )
Concentration of calcium binding sites at location 2 [mmol/L]

C_CaT_sys_beg( )
Concentration of total calcium systemically at beginning of interval

[mmol/L] (e.g., 2 to 2.6 mmol/L)

C_CaT_loc1( )
Concentration of total calcium at location 1 [mmol/L]

C_CaT_loc2( )
Concentration of total calcium at location 2 [mmol/L]

C_Cafree_loc2( )
Concentration of free calcium at location 2 [mmol/L]

C_CiT_loc1( )
Concentration of total citrate at location 1 [mmol/L]

C_CiT_loc2( )
Concentration of total citrate at location 2 [mmol/L]

Qp_sys( )
Plasma flow rate “systemically” (i.e., not accounting for access

recirculation) [L/min]

Qp_loc1( )
Plasma flow rate at location 1 [L/min]

Qp_loc2( )
Plasma flow rate at location 2 [L/min]

Qp_loc3( )
Plasma flow rate at location 3 [L/min]

Qp_loc4( )
Plasma flow rate at location 4 [L/min]

Qpw_sys( )
Plasma water flow rate “systemically” (i.e., not accounting for

recirculation) [L/min]

Qpw_loc1( )
Plasma water flow rate at location 1 [L/min]

Qpw_loc2( )
Plasma water flow rate at location 2 [L/min]

Qpw_loc3( )
Plasma water flow rate at location 3 [L/min]

Qpw_loc4( )
Plasma water flow rate at location 4 [L/min]

Hct_loc1( )
Hematocrit at location 1 [vol-%/100]

Hct_loc4( )
Hematocrit at location 2 [vol-%/100]

C_CiT_sys_beg( )
Concentration of total citrate systemically at beginning of interval

[mmol/L] (e.g., 0.05 to 0.2 mmol/L)

Rate_Ci_infusion( )
Citrate infusion rate [L/min] (e.g., 0 to 0.0083 L/min)

C_CaCi_loc2( )
Concentration of calcium-citrate complexes at location 2 [mmol/L]

C_Cifree_loc5
Dialysate inlet stream concentration of free citrate [mmol/L]

C_Cafree_loc5
Dialysate inlet stream concentration of free calcium [mmol/L]

C_CaCi_loc5
Dialysate inlet stream concentration of calcium-citrate complexes

[mmol/L]

dC_CaCi( )
Concentration gradient for calcium citrate complexes (dialysate-side

concentration minus blood-side concentration) [mmol/L]

Qe_CaCi( )
Effective solute diffusion volume flow rate for calcium-citrate

complexes [L/min]

D_CaCi( )
Dialysance of calcium-citrate complexes [L/min]

Jdiff_CaCi( )
Diffusive flux of calcium-citrate complexes [mmol/min]

C_Cifree_loc2( )
Concentration of free citrate at location 2 [mmol/L]

dC_Cifree( )
Concentration gradient for free citrate (dialysate-side concentration

minus blood-side concentration) [mmol/L]

Qe_Cifree
Effective solute diffusion volume flow rate for free citrate [L/min]

D_Cifree( )
Dialysance of free citrate [L/min]

Jdiff_Cifree( )
Diffusive flux of free citrate [mmol/min]

dC_Cafree( )
Concentration gradient for free calcium (dialysate-side concentration

minus blood-side concentration) [mmol/L]

Qe_Cafree( )
Effective solute diffusion volume flow rate for free calcium [L/min]

D_Cafree( )
Dialysance of free calcium [L/min]

Jdiff_Cafree( )
Diffusive flux of free calcium [mmol/min]

Rate_CaCi_loc2( )
Rate of calcium-citrate complexes entering dialyzer at blood inlet

[mmol/min]

constr_Rate_CaCi_loc3( )
Rate of calcium-citrate complexes leaving dialyzer at blood outlet,

not considering convection [mmol/min]

constr_C_CaCi_loc3_unequ( )
Hypothetical unequilibrated post-filter concentration of calcium-

citrate complexes if ultrafiltration did not remove CaCi [mmol/L]

Rate_Cifree_loc2( )
Rate of free citrate entering dialyzer at blood inlet [mmol/min]

constr_Rate_Cifree_loc3( )
Rate of free citrate leaving dialyzer at blood outlet, not considering

convection [mmol/min]

constr_C_Cifree_loc3_unequ( )
Hypothetical unequilibrated post-filter concentration of free citrate if

ultrafiltration did not remove free citrate [mmol/L]

Rate_Cafree_loc2( )
Rate of free calcium entering dialyzer at blood inlet [mmol/min]

constr_Rate_Cafree_loc3( )
Rate of free calcium leaving dialyzer at blood outlet, not considering

convection [mmol/min]

constr_C_Cafree_loc3_unequ( )
Hypothetical unequilibrated post-filter concentration of free calcium

if ultrafiltration did not remove free calcium [mmol/L]

C_CaCi_forconvection( )
Concentration of calcium-citrate complexes used for calculating

convective flux [mmol/L]

C_Cifree_forconvection( )
Concentration of free citrate used for calculating convective flux

[mmol/L]

C_Cafree_forconvection( )
Concentration of free calcium used for calculating convective flux

[mmol/L]

Jconv_Cafree( )
Convective flux of free calcium [mmol/min]

Jconv_CaCi( )
Convective flux of calcium-citrate complexes [mmol/min]

Jconv_Cifree( )
Convective flux of free citrate [mmol/min]

Jdiff_CaT( )
Diffusive flux of calcium (of all forms) [mmol/min]

Jconv_CaT( )
Convective flux of calcium (of all forms) [mmol/min]

Jtotal_CaT( )
Total (diffusive and convective) flux of calcium (of all forms)

[mmol/min]

Jdiff_CiT( )
Diffusive flux of citrate (of all forms) [mmol/min]

Jconv_CiT( )
Convective flux of citrate (of all forms) [mmol/min]

Jtotal_CiT( )
Total (diffusive and convective) flux of citrate (of all forms)

[mmol/min]

C_CaT_loc3( )
Concentration of total calcium at location 3 [mmol/L]

C_CaT_loc4( )
Concentration of total calcium at location 4 [mmol/L]

C_CiT_loc3( )
Concentration of total citrate at location 3 [mmol/L]

C_CiT_loc4( )
Concentration of total citrate at location 4 [mmol/L]

hc_factor( )
Hemoconcentration factor (Qpwo/Qpwi) [dimensionless]

C_bindingsites_loc3( )
Concentration of calcium binding sites at location 3 [mmol/L]

C_bindingsites_loc4( )
Concentration of calcium binding sites at location 4 [mmol/L]

C_Cafree_loc3( )
Concentration of free calcium at location 3 [mmol/L]

C_CaCi_loc3( )
Concentration of calcium-citrate complexes at location 3 [mmol/L]

C_Cifree_loc3( )
Concentration of free citrate at location 3 [mmol/L]

C_Cafree_loc4( )
Concentration of free calcium at location 4 [mmol/L]

C_CaCi_loc4( )
Concentration of calcium-citrate complexes at location 4 [mmol/L]

C_Cifree_loc4( )
Concentration of free citrate at location 4 [mmol/L]

ECV_beg( )
Estimated extracellular volume (ECV) at beginning of interval [L]

N_CiT_ECV_beg( )
Amount of total citrate in ECV at beginning of interval [mmol]

N_CaT_ECV_beg( )
Amount of total calcium in ECV at beginning of interval [mmol]

Rate_Ca_infusion( )
Rate of calcium infusion [L/min] (e.g., 0.00067 L/min]

N_CiT_infused_interval( )
Amount of citrate infused during interval [mmol]

N_CaT_infused_interval( )
Amount of calcium substituted post-filter during interval [mmol]

dN_CiT_systemic_interval( )
Net systemic change in total citrate during interval [mmol]

dN_CaT_systemic_interval( )
Net systemic change in total calcium during interval [mmol]

N_CiT_ECV_end_noMETnoG( )
Amount of total citrate in ECV at end of interval, not accounting for

citrate generation or metabolism [mmol]

N_CaT_ECV_end_prebuffering( )
Amount of total Ca in ECV at end of interval before calcium buffering

[mmol]

UF_interval( )
Ultrafiltration volume during interval [L]

Vol_Ci_infusion_interval( )
Volume infused with citrate infusion during interval [L]

Vol_Ca_infusion_interval( )
Volume infused with calcium substitution during interval [L]

ECV_end( )
Estimated ECV at end of interval [L]

G_Ci_interval( )
Generation of citrate during interval [mmol]

N_CiT_ECV_end_noMET( )
Amount of total citrate in ECV at end of interval, accounting for

citrate generation but not yet for metabolism [mmol]

C_CiT_ECV_end_noMET( )
Concentration of total citrate in ECV at end of interval, accounting

for citrate generation but not yet for metabolism [mmol/L]

average_C_CiT_sys_interval( )
Average systemic citrate concentration between beginning and end

of interval [mmol/L]

N_Ci_metabolized_interval( )
Amount of citrate metabolized during interval [mmol]

N_CiT_ECV_end( )
Amount of total citrate in ECV at end of interval, accounting for

citrate generation, citrate metabolism, and dialyzer flux [mmol]

C_CiT_sys_end( )
Systemic concentration of total citrate at end of interval [mmol/L]

MCa( )
Mobilization/sequestration of Ca from/to miscible calcium pool

[mmol]

C_CaT_sys_end( )
Systemic concentration of total calcium at end of interval [mmol/L]

ECV_contractionfactor_interval( )
ECV contraction factor for interval (ECV_beg/ECV_end)

[dimensionless]

C_Cafree_sys_beg( )
Systemic concentration of ionized calcium at beginning of interval

[mmol/L]

TABLE II

Sample code (VBA) for Simulation Mode 1

Note: This excerpt is intended to illustrate one possible implementation of the key

elements of the model (simulation mode 1). Certain steps (e.g., re-dimensioning arrays,

setting certain variables prior to first use, procedure for routing to specified simulation

mode, calculation of cumulative parameters such as mass balances, reporting simulation

results, etc.) are omitted.

Simulation modes 2 and 3 are also omitted, as they are adaptations of the presented code,

and their implementation will be straightforward to a reader skilled in the art.

Determining number of
req_iterations_HD = Round(td / interval_intra, 0)

required iterations
req_iterations_post = Round(tpost / interval_post, 0) + 1

(1 is added to
req_iterations = req_iterations_HD + req_iterations_post ‘ Note: Since we

req_iterations_post so as to
are working with option base 0, the run-in element is included in the

get 1 additional iteration;
array size if it is redimensioned to req_iterations

this will overshoot the

intended post-HD

observation time, but this

iteration's values will be

required for

printing/reporting.)

Setting counter and starting
run_in = 1 / 60000 ‘ 1 millisecond

time
c = 0

time(c) = 0

Setting internal constants
cf_Ca_mmol_to_mg = 40.078

Priming input variables
Hct_sys(c) = rng_Hct_sys.Value / 100
‘ [vol-%/100]

from spreadsheet that are
C_CiT_sys_beg(c) = rng_C_CiT_sys_beg.Value
‘ [mmol/l]

arrays (UFR, CaCl2
C_CaT_sys_beg(c) = rng_C_CaT_sys_beg.Value
‘ [mmol/l]

substitution and citrate
C_prot_sys_beg(c) = rng_C_prot_sys_beg.Value * 10
‘ [g/l]

infusion (if applicable) are
C_Cafree_loc2(c) = rng_C_Cafree_loc2.Value
‘ [mmol/l]

not read here. They are

read down in the

iterations.)

Priming goal seek range
rng_gs_K_CaCi.Value = K_CaCi

rng_gs_K_CaP.Value = K_CaP

rng_gs_cubic.Value = “=D3 {circumflex over ( )} 3 + D3 {circumflex over ( )} 2 * (E3 + F3 + G3 + H3 − I3) + D3

* (E3 * F3 + F3 * G3 + E3 * H3 − E3 * I3 − F3 * I3) − E3 * F3 * I3”

Setting goal seek iCa
gs_iCa_default_sys = 1.5

defaults

If sel_sim_mode = 3 Then

gs_iCa_default_loc2 = 1.5

Else

gs_iCa_default_loc2 = C_Cafree_loc2(c) + 0.05

End If

If sel_sim_mode = 3 Then

gs_iCa_default_loc3 = 1.5

Else

gs_iCa_default_loc3 = C_Cafree_loc2(c) + 0.4

End If

gs_iCa_default_loc4 = 1.5

FIRST ITERATION

Set Qb and Qp at sys and
Qb_sys(c) = Qb

loc1
Qb_loc1(c) = Qb

Qp_sys(c) = (1 − Hct_sys(c)) * Qb_sys(c)

(run-in iteration; no
Qp_loc1(c) = Qp_sys(c)

recirculation considered)

Set interval length
interval = run_in

Systemic conc. of binding
C_bindingsites_sys_beg(c) = (12 * C_prot_sys_beg(c) / 69000) * 1000

sites at beginning of

interval

Conc. of binding sites at
C_bindingsites_loc1(c) = C_bindingsites_sys_beg(c)

loc1 (not accounting for

access recirculation, since

this is run-in iteration)

Total calcium and citrate
C_CaT_loc1(c) = C_CaT_sys_beg(c)

concentrations at loc1 (run-
C_CiT_loc1(c) = C_CiT_sys_beg(c)

in iteration; not accounting

for access recirculation)

Required citrate conc. in
C_CiT_loc2(c) = (−C_Cafree_loc2(c) {circumflex over ( )} 3 − C_Cafree_loc2(c) {circumflex over ( )} 2 * K_CaCi −

plasma water inlet stream
C_Cafree_loc2(c) {circumflex over ( )} 2 * K_CaP − C_Cafree_loc2(c) {circumflex over ( )} 2 *

to reach pre-filter iCa target
C_bindingsites_loc1(c) + C_Cafree_loc2(c) {circumflex over ( )} 2 * C_CaT_loc1(c) −

(ignoring the dilution
C_Cafree_loc2(c) * K_CaCi * K_CaP − C_Cafree_loc2(c) * K_CaCi *

caused by the citrate
C_bindingsites_loc1(c) + C_Cafree_loc2(c) * K_CaCi * C_CaT_loc1(c)

infusion)
+ C_Cafree_loc2(c) * K_CaP * C_CaT_loc1(c) + K_CaCi * K_CaP *

C_CaT_loc1(c)) / (C_Cafree_loc2(c) {circumflex over ( )} 2 + C_Cafree_loc2(c) * K_CaP)

Serum protein
C_prot_loc1(c) = C_prot_sys_beg(c) ‘ run-in iteration; recirculation not

concentration at loc1 (run-
considered

in iteration; not accounting

for access recirculation)

Plasma water flow rate at
Qpw_loc1(c) = Qp_loc1(c) * (0.989 − 0.0074 * (C_prot_loc1(c) / 10))

loc1

Required rate of citrate
Rate_Ci_infusion(c) = (Qpw_loc1(c) * (C_CiT_loc1(c) − C_CiT_loc2(c))) /

infusion to reach pre-filter
(C_CiT_loc2(c) − C_Ci_infusion)

iCa target

Resulting pwi flow
Qpw_loc2(c) = Qpw_loc1(c) + Rate_Ci_infusion(c)

Iterating to find true rate of
If sel_skip_Ci_infusion_iteration = False Then

citrate infusion required

(since the above does not
reduction = 0

account for dilution caused
dilution = (Qpw_loc2(c) − reduction) / Qpw_loc1(c)

by the citrate infusion itself)
C_CaT_loc2(c) = C_CaT_loc1(c) / dilution

C_bindingsites_loc2(c) = C_bindingsites_loc1(c) / dilution

(Goal seek for pre-filter
rng_gs_iCa.Value = gs_iCa_default_loc2

ionized calcium)
rng_gs_C_CiT.Value = C_CiT_loc2(c)

rng_gs_C_bindingsites.Value = C_bindingsites_loc2(c)

rng_gs_C_CaT.Value = C_CaT_loc2(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

actual_C_Cafree = rng_gs_iCa.Value

If actual_C_Cafree > C_Cafree_loc2(c) Then

MsgBox (“Actual pre-filter iCa was already > target to begin with!”)

Exit Sub

End If

If sel_use_iCa_tolerance = True Then

If actual_C_Cafree > C_Cafree_loc2(c) − tolerance_Cafree_loc2 Then

GoTo leave_match_sim1_iter1

End If

If Rate_Ci_infusion(c) − (reduction + reduction_step) <= 0 Then GoTo

leave_match_sim1_iter1

Do

reduction = reduction + reduction_step

dilution = (Qpw_loc2(c) − reduction) / Qpw_loc1(c)

C_CaT_loc2(c) = C_CaT_loc1(c) / dilution

C_bindingsites_loc2(c) = C_bindingsites_loc1(c) / dilution

actual_C_CiT = (C_Ci_infusion * (Rate_Ci_infusion(c) − reduction) +

C_CiT_loc1(c) * Qpw_loc1(c)) / (Rate_Ci_infusion(c) − reduction +

Qpw_loc1(c))

(Goal seek for pre-filter
rng_gs_iCa.Value = gs_iCa_default_loc2

ionized calcium)
rng_gs_C_CiT.Value = actual_C_CiT

rng_gs_C_bindingsites.Value = C_bindingsites_loc2(c)

rng_gs_C_CaT.Value = C_CaT_loc2(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

actual_C_Cafree = rng_gs_iCa.Value

If actual_C_Cafree > C_Cafree_loc2(c) Then GoTo

leave_overshot_sim1_iter1

If sel_use_iCa_tolerance = True Then

If actual_C_Cafree > C_Cafree_loc2(c) − tolerance_Cafree_loc2 Then

GoTo leave_match_sim1_iter1

End If

If Rate_Ci_infusion(c) − (reduction + reduction_step) <= 0 Then GoTo

leave_match_sim1_iter1

Loop

leave_overshot_sim1_iter1:

reduction = reduction − reduction_step

Rate_Ci_infusion(c) = Rate_Ci_infusion(c) − reduction

Qpw_loc2(c) = Qpw_loc1(c) + Rate_Ci_infusion(c)

dilution = (Qpw_loc2(c) − reduction) / Qpw_loc1(c)

C_CaT_loc2(c) = C_CaT_loc1(c) / dilution

C_bindingsites_loc2(c) = C_bindingsites_loc1(c) / dilution

C_CiT_loc2(c) = (C_Ci_infusion * (Rate_Ci_infusion(c) − reduction) +

C_CiT_loc1(c) * Qpw_loc1(c)) / (Rate_Ci_infusion(c) − reduction +

Qpw_loc1(c))

leave_match_sim1_iter1:

Rate_Ci_infusion(c) = Rate_Ci_infusion(c) − reduction

Qpw_loc2(c) = Qpw_loc1(c) + Rate_Ci_infusion(c)

C_CiT_loc2(c) = actual_C_CiT

End If

Concentration of calcium-
C_CaCi_loc2(c) = ((C_Cafree_loc2(c) * C_CiT_loc2(c)) / (K_CaCi +

citrate complexes pre-filter
C_Cafree_loc2(c)))

Determine dialysate
C_Cifree_loc5 = −0.5 * (C_CaT_loc5 − C_CiT_loc5 + K_CaCi) + Sqr((0.5 *

composition (free citrate,
(C_CaT_loc5 − C_CiT_loc5 + K_CaCi)) {circumflex over ( )} 2 + (K_CaCi * C_CiT_loc5))

free calcium, calcium-citrate
If C_CiT_loc5 = 0 Then

complexes)
C_Cafree_loc5 = C_CaT_loc5

Else

C_Cafree_loc5 = (K_CaCi * (C_CiT_loc5 − C_Cifree_loc5)) / C_Cifree_loc5

End If

C_CaCi_loc5 = (C_Cafree_loc5 * C_Cifree_loc5) / K_CaCi

DIFFUSIVE FLUXES

Calculate diffusive flux of
dC_CaCi(c) = C_CaCi_loc5 − C_CaCi_loc2(c)

calcium-citrate complexes
Qe_CaCi(c) = Qpw_loc2(c)

across the dialyzer
D_CaCi(c) = ((Exp(((1 / Qe_CaCi(c)) − (1 / Qd)) * KoA_CaCi) − 1) / (Exp(((1 /

membrane
Qe_CaCi(c)) − (1 / Qd)) * KoA_CaCi) − (Qe_CaCi(c) / Qd))) *

Qe_CaCi(c)

Jdiff_CaCi(c) = D_CaCi(c) * dC_CaCi(c)

C_Cifree_loc2(c) = C_CiT_loc2(c) − C_CaCi_loc2(c)

dC_Cifree(c) = C_Cifree_loc5 − C_Cifree_loc2(c)

Calculate diffusive flux of
Qe_Cifree(c) = Qpw_loc2(c)

free citrate across the
D_Cifree(c) = ((Exp(((1 / Qe_Cifree(c)) − (1 / Qd)) * KoA_Cifree) − 1) /

dialyzer membrane
(Exp(((1 / Qe_Cifree(c)) − (1 / Qd)) * KoA_Cifree) − (Qe_Cifree(c) /

Qd))) * Qe_Cifree(c)

Jdiff_Cifree(c) = D_Cifree(c) * dC_Cifree(c)

Calculate diffusive flux of
dC_Cafree(c) = C_Cafree_loc5 − C_Cafree_loc2(c)

free calcium across the
Qe_Cafree(c) = Qpw_loc2(c)

dialyzer membrane
D_Cafree(c) = ((Exp(((1 / Qe_Cafree(c)) − (1 / Qd)) * KoA_Cafree) − 1) /

(Exp(((1 / Qe_Cafree(c)) − (1 / Qd)) * KoA_Cafree) − (Qe_Cafree(c) /

Qd))) * Qe_Cafree(c)

Jdiff_Cafree(c) = D_Cafree(c) * dC_Cafree(c)

Rates of calcium-citrate
Rate_CaCi_loc2(c) = C_CaCi_loc2(c) * Qpw_loc2(c)

complexes, free citrate, and
Rate_Cifree_loc2(c) = C_Cifree_loc2(c) * Qpw_loc2(c)

free calcium entering the
Rate_Cafree_loc2(c) = C_Cafree_loc2(c) * Qpw_loc2(c)

dialyzer

Read current ultrafiltration
UFR(c) = Application.WorksheetFunction.VLookup(time(c), rng_UFR, 2, True) /

rate
(60000)

Concentration constructs
constr_Rate_CaCi_loc3(c) = Rate_CaCi_loc2(c) + Jdiff_CaCi(c)

(for solutes leaving blood
constr_C_CaCi_loc3_unequ(c) = constr_Rate_CaCi_loc3(c) / (Qpw_loc2(c) −

outlet) for calculating
UFR(c))

convective flux
constr_Rate_Cifree_loc3(c) = Rate_Cifree_loc2(c) + Jdiff_Cifree(c)

constr_C_Cifree_loc3_unequ(c) = constr_Rate_Cifree_loc3(c) / (Qpw_loc2(c) −

UFR(c))

constr_Rate_Cafree_loc3(c) = Rate_Cafree_loc2(c) + Jdiff_Cafree(c)

constr_C_Cafree_loc3_unequ(c) = constr_Rate_Cafree_loc3(c) /

(Qpw_loc2(c) − UFR(c))

Concentrations used for
C_CaCi_forconvection(c) = (C_CaCi_loc2(c) + 2 *

calculating convective
constr_C_CaCi_loc3_unequ(c)) / 3

losses
C_Cifree_forconvection(c) = (C_Cifree_loc2(c) + 2 *

constr_C_Cifree_loc3_unequ(c)) / 3

C_Cafree_forconvection(c) = (C_Cafree_loc2(c) + 2 *

constr_C_Cafree_loc3_unequ(c)) / 3

CONVECTIVE FLUXES of
Jconv_Cafree(c) = −C_Cafree_forconvection(c) * UFR(c)

free calcium, calcium-citrate
Jconv_CaCi(c) = −C_CaCi_forconvection(c) * UFR(c)

complexes, and free citrate
Jconv_Cifree(c) = −C_Cifree_forconvection(c) * UFR(c)

TOTAL FLUXES

Total calcium flux
Jdiff_CaT(c) = Jdiff_CaCi(c) + Jdiff_Cafree(c)

Jconv_CaT(c) = Jconv_Cafree(c) + Jconv_CaCi(c)

Jtotal_CaT(c) = Jdiff_CaT(c) + Jconv_CaT(c)

Total citrate flux
Jdiff_CiT(c) = Jdiff_CaCi(c) + Jdiff_Cifree(c)

Jconv_CiT(c) = Jconv_CaCi(c) + Jconv_Cifree(c)

Jtotal_CiT(c) = Jdiff_CiT(c) + Jconv_CiT(c)

Post-filter concentrations of
Qpw_loc3(c) = Qpw_loc2(c) − UFR(c)

total calcium and total
C_CaT_loc3(c) = ((C_CaT_loc2(c) * Qpw_loc2(c)) + Jtotal_CaT(c)) /

citrate
(Qpw_loc3(c))

C_CiT_loc3(c) = ((C_CiT_loc2(c) * Qpw_loc2(c)) + Jtotal_CiT(c)) /

(Qpw_loc3(c))

Equilibrated post-filter
hc_factor(c) = Qpw_loc3(c) / Qpw_loc2(c)

concentrations of free
C_bindingsites_loc3(c) = C_bindingsites_loc2(c) / hc_factor(c)

calcium, free citrate, and

calcium-citrate complexes

Goal seek for post-filter
rng_gs_iCa.Value = gs_iCa_default_loc3

ionized calcium (loc3)
rng_gs_C_CiT.Value = C_CiT_loc3(c)

rng_gs_C_bindingsites.Value = C_bindingsites_loc3(c)

rng_gs_C_CaT.Value = C_CaT_loc3(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_loc3(c) = rng_gs_iCa.Value

C_CaCi_loc3(c) = ((C_Cafree_loc3(c) * C_CiT_loc3(c)) / (K_CaCi +

C_Cafree_loc3(c)))

C_Cifree_loc3(c) = C_CiT_loc3(c) − C_CaCi_loc3(c)

Read current Ca infusion
Rate_Ca_infusion(c) = Application.WorksheetFunction.VLookup(time(c),

rate [l/min]
rng_Ca_infusion, 2, True) / (60000)

Blood, plasma, and plasma
Qpw_loc4(c) = Qpw_loc3(c) + Rate_Ca_infusion(c)

water flow rates at loc4
Qb_loc4(c) = Qb_loc1(c) + Rate_Ci_infusion(c) − UFR(c) +

Rate_Ca_infusion(c)

Ratio of plasma water to
R_pw_wb_loc4(c) = Qpw_loc4(c) / Qb_loc4(c)

whole blood at loc4

Post-Ca-infusion
C_CaT_loc4(c) = (C_CaT_loc3(c) * Qpw_loc3(c) + C_Ca_infusion *

concentrations of total
Rate_Ca_infusion(c)) / Qpw_loc4(c)

calcium and total citrate
C_CiT_loc4(c) = (C_CiT_loc3(c) * Qpw_loc3(c)) / Qpw_loc4(c)

(loc4)

Plasma flow rate at loc4
Qp_loc4(c) = Qp_loc1(c) + Rate_Ci_infusion(c) − UFR(c) +

Rate_Ca_infusion(c)

Serum protein
C_prot_loc4(c) = C_prot_loc1(c) / (Qp_loc4(c) / Qp_loc1(c))

concentration at loc4

Ratio of plasma to whole
R_p_wb_loc4(c) = Qp_loc4(c) / Qb_loc4(c)

blood at loc4

Hematocrit at loc4
Hct_loc4(c) = (Qb_loc4(c) − Qp_loc4(c)) / Qb_loc4(c)

Theoretical whole blood
C_CaT_loc4_wb(c) = C_CaT_loc4(c) * R_pw_wb_loc4(c)

concentrations of relevant
C_CiT_loc4_wb(c) = C_CiT_loc4(c) * R_pw_wb_loc4(c)

solutes (used for
C_prot_loc4_wb(c) = C_prot_loc4(c) * R_p_wb_loc4(c)

recirculation)

Equilibrated post-Ca-
hc_factor(c) = Qpw_loc4(c) / Qpw_loc3(c)

infusion concentrations of
C_bindingsites_loc4(c) = C_bindingsites_loc3(c) / hc_factor(c)

free calcium, free citrate,

and calcium-citrate
‘ Goal seek for post-Ca-infusion ionized Ca (loc4)

complexes
rng_gs_iCa.Value = gs_iCa_default_loc4

rng_gs_C_CiT.Value = C_CiT_loc4(c)

rng_gs_C_bindingsites.Value = C_bindingsites_loc4(c)

rng_gs_C_CaT.Value = C_CaT_loc4(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_loc4(c) = rng_gs_iCa.Value

C_CaCi_loc4(c) = ((C_Cafree_loc4(c) * C_CiT_loc4(c)) / (K_CaCi +

C_Cafree_loc4(c)))

C_Cifree_loc4(c) = C_CiT_loc4(c) − C_CaCi_loc4(c)

ECV at beginning of interval
ECV_beg(c) = (Vurea / 3) + wtgain

Amounts of citrate and
N_CiT_ECV_beg(c) = C_CiT_sys_beg(c) * ECV_beg(c)

calcium in ECV at beginning
N_CaT_ECV_beg(c) = C_CaT_sys_beg(c) * ECV_beg(c)

of interval

Amounts of citrate and
N_CiT_infused_interval(c) = Rate_Ci_infusion(c) * C_Ci_infusion * interval

calcium infused during
N_CaT_infused_interval(c) = Rate_Ca_infusion(c) * C_Ca_infusion * interval

interval

Net systemic changes in
dN_CiT_systemic_interval(c) = (Jtotal_CiT(c) * interval) +

total citrate and total
N_CiT_infused_interval(c)

calcium during interval
dN_CaT_systemic_interval(c) = (Jtotal_CaT(c) * interval) +

N_CaT_infused_interval(c)

Amount of citrate in ECV at
N_CiT_ECV_end_noMETnoG(c) = N_CiT_ECV_beg(c) +

end of interval, not
dN_CiT_systemic_interval(c)

considering citrate

generation or metabolism

Amount of total calcium in
N_CaT_ECV_end_prebuffering(c) = N_CaT_ECV_beg(c) +

ECV at end of interval, not
dN_CaT_systemic_interval(c)

considering buffering. Note

that this is the unbuffered

amount for this particular

interval, but it is the

buffered amount that is

carried forward to the

beginning of the next

interval, which will be

different if KMP is not equal

to 0.

UF_interval(c) = UFR(c) * interval

Vol_Ci_infusion_interval(c) = Rate_Ci_infusion(c) * interval

Vol_Ca_infusion_interval(c) = Rate_Ca_infusion(c) * interval

ECV at end of interval
ECV_end(c) = ECV_beg(c) − UF_interval(c) + Vol_Ci_infusion_interval(c) +

Vol_Ca_infusion_interval(c)

Citrate generation rate
G_Ci_interval(c) = ((Rate_G_Ci * interval) / (24 * 60)) / (192.12352)

during interval

Amount of citrate in ECV at
N_CiT_ECV_end_noMET(c) = N_CiT_ECV_end_noMETnoG(c) +

end of interval, considering
G_Ci_interval(c)

citrate generation but not

metabolism

Citrate concentration in ECV
C_CiT_ECV_end_noMET(c) = N_CiT_ECV_end_noMET(c) / ECV_end(c)

at end of interval,

considering citrate

generation but not

metabolism

average_C_CiT_sys_interval(c) =

WorksheetFunction.Average(C_CiT_ECV_end_noMET(c),

C_CiT_sys_beg(c))

Amount of citrate
N_Ci_metabolized_interval(c) = N_CiT_ECV_end_noMET(c) −

metabolized during interval
(average_C_CiT_sys_interval(c) * Exp(−k_Ci * interval) *

WorksheetFunction.Average(ECV_end(c), ECV_beg(c)))

Amount of citrate in ECV at
N_CiT_ECV_end(c) = N_CiT_ECV_end_noMET(c) −

end of interval, considering
N_Ci_metabolized_interval(c)

generation and metabolism

Total systemic citrate conc.
C_CiT_sys_end(c) = N_CiT_ECV_end(c) / ECV_end(c)

at end of interval

Mobilization/sequestration
MCa(c) = −((Jdiff_CaT(c) * interval) + N_CaT_infused_interval(c)) * KMP

of calcium during interval

Total systemic calcium
C_CaT_sys_end(c) = (N_CaT_ECV_end_prebuffering(c) + MCa(c)) /

concentration at end of
ECV_end(c)

interval

ECV contraction factor for
ECV_contractionfactor_interval(c) = ECV_beg(c) / ECV_end(c)

interval

Goal seek for systemic
rng_gs_iCa.Value = gs_iCa_default_sys

ionized calcium at
rng_gs_C_CiT.Value = C_CiT_sys_beg(c)

beginning of interval
rng_gs_C_bindingsites.Value = C_bindingsites_sys_beg(c)

rng_gs_C_CaT.Value = C_CaT_sys_beg(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_sys_beg(c) = rng_gs_iCa.Value

REMAINING

INTRADIALYTIC

ITERATIONS

Set the interval length back
interval = interval_intra

from the run_in interval

length to the user-defined

interval length for the

intradialytic iterations

Set time(0) to 0 − interval
time(c) = 0 − interval

so that the following

iterations will start from

time(1) = 0 minutes. (This is

done here instead of right

from the start because 0 −

interval is negative, which

would cause the VLookup

function in the first iteration

to fail.)

Do

c = c + 1

time(c) = time(c − 1) + interval

Systemic concentration of
C_prot_sys_beg(c) = C_prot_sys_beg(c − 1) *

total protein
ECV_contractionfactor_interval(c − 1)

Systemic concentration of
C_bindingsites_sys_beg(c) = (12 * C_prot_sys_beg(c) / 69000) * 1000

binding sites at beginning

of interval

Total systemic calcium and
C_CaT_sys_beg(c) = C_CaT_sys_end(c − 1)

citrate concentrations at
C_CiT_sys_beg(c) = C_CiT_sys_end(c − 1)

beginning of interval

Systemic hematocrit at
Hct_sys(c) = Hct_sys(c − 1) / (Hct_sys(c − 1) + ((1 − Hct_sys(c − 1)) /

beginning of interval
ECV_contractionfactor_interval(c − 1)))

“Systemic” plasma and
Qp_sys(c) = Qb * (1 − Hct_sys(c))

plasma water flow rates
Qpw_sys(c) = Qp_sys(c) * (0.989 − 0.0074 * (C_prot_sys_beg(c) / 10))

Systemic ratios of plasma
R_p_wb_sys(c) = Qp_sys(c) / Qb

to whole blood and plasma
R_pw_wb_sys(c) = Qpw_sys(c) / Qb

water to whole blood

Theoretical systemic whole
C_prot_sys_beg_wb(c) = C_prot_sys_beg(c) * R_p_wb_sys(c)

blood concentrations of
C_CaT_sys_beg_wb(c) = C_CaT_sys_beg(c) * R_pw_wb_sys(c)

relevant solutes (for
C_CiT_sys_beg_wb(c) = C_CiT_sys_beg(c) * R_pw_wb_sys(c)

recirculation)

Hematocrit at loc1
Hct_loc1(c) = recirc_access * Hct_loc4(c − 1) + (1 − recirc_access) *

Hct_sys(c)

Blood and plasma flow
Qb_loc1(c) = Qb

rates at loc1, and the ratio
Qp_loc1(c) = Qb_loc1(c) * (1 − Hct_loc1(c))

of plasma to whole blood at
R_p_wb_loc1(c) = Qp_loc1(c) / Qb_loc1(c)

loc1

Protein concentration at

loc1:

1) Theoretical whole blood
C_prot_loc1_wb(c) = recirc_access * (C_prot_loc4_wb(c − 1)) + (1 −

concentration
recirc_access) * C_prot_sys_beg_wb(c)

2) Plasma concentration
C_prot_loc1(c) = C_prot_loc1_wb(c) / R_p_wb_loc1(c)

Plasma water flow rate at
Qpw_loc1(c) = Qp_loc1(c) * (0.989 − 0.0074 * (C_prot_loc1(c) / 10))

loc1

Ratio of plasma water to
R_pw_wb_loc1(c) = Qpw_loc1(c) / Qb_loc1(c)

whole blood at loc1

Total calcium and citrate

concentrations at loc1

(accounting for

recirculation)

1) as theoretical whole
C_CaT_loc1_wb(c) = recirc_access * C_CaT_loc4_wb(c − 1) + (1 −

blood concentrations
recirc_access) * C_CaT_sys_beg_wb(c)

C_CiT_loc1_wb(c) = recirc_access * C_CiT_loc4_wb(c − 1) + (1 −

recirc_access) * C_CiT_sys_beg_wb(c)

2) reverting to plasma
C_CaT_loc1(c) = C_CaT_loc1_wb(c) / R_pw_wb_loc1(c)

water concentrations
C_CiT_loc1(c) = C_CiT_loc1_wb(c) / R_pw_wb_loc1(c)

Concentration of calcium
C_bindingsites_loc1(c) = (12 * C_prot_loc1(c) / 69000) * 1000

binding sites at loc1

Plasma water and citrate
Rate_Ci_infusion(c) = Rate_Ci_infusion(c − 1)

infusion flow rates and the
Qpw_loc2(c) = Qpw_loc1(c) + Rate_Ci_infusion(c)

resulting pre-filter total
C_CiT_loc2(c) = (C_Ci_infusion * Rate_Ci_infusion(c) + C_CiT_loc1(c) *

citrate concentration
Qpw_loc1(c)) / Qpw_loc2(c)

Determining the resulting
dilution = Qpw_loc2(c) / Qpw_loc1(c)

pre-filter ionized calcium
C_CaT_loc2(c) = C_CaT_loc1(c) / dilution

concentration
C_bindingsites_loc2(c) = C_bindingsites_loc1(c) / dilution

rng_gs_iCa.Value = gs_iCa_default_loc2

rng_gs_C_CiT.Value = C_CiT_loc2(c)

rng_gs_C_bindingsites.Value = C_bindingsites_loc2(c)

rng_gs_C_CaT.Value = C_CaT_loc2(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_loc2(c) = rng_gs_iCa.Value

Concentration of calcium-
C_CaCi_loc2(c) = ((C_Cafree_loc2(c) * C_CiT_loc2(c)) / (K_CaCi +

citrate complexes pre-filter
C_Cafree_loc2(c)))

DIFFUSIVE FLUXES

Diffusive flux of calcium-
dC_CaCi(c) = C_CaCi_loc5 − C_CaCi_loc2(c)

citrate complexes
Qe_CaCi(c) = Qpw_loc2(c)

D_CaCi(c) = ((Exp(((1 / Qe_CaCi(c)) − (1 / Qd)) * KoA_CaCi) − 1) / (Exp(((1 /

Qe_CaCi(c)) − (1 / Qd)) * KoA_CaCi) − (Qe_CaCi(c) / Qd))) *

Qe_CaCi(c)

Jdiff_CaCi(c) = D_CaCi(c) * dC_CaCi(c)

Diffusive flux of free citrate
C_Cifree_loc2(c) = C_CiT_loc2(c) − C_CaCi_loc2(c)

dC_Cifree(c) = C_Cifree_loc5 − C_Cifree_loc2(c)

Qe_Cifree(c) = Qpw_loc2(c)

D_Cifree(c) = ((Exp(((1 / Qe_Cifree(c)) − (1 / Qd)) * KoA_Cifree) − 1) /

(Exp(((1 / Qe_Cifree(c)) − (1 / Qd)) * KoA_Cifree) − (Qe_Cifree(c) /

Qd))) * Qe_Cifree(c)

Jdiff_Cifree(c) = D_Cifree(c) * dC_Cifree(c)

Diffusive flux of free
dC_Cafree(c) = C_Cafree_loc5 − C_Cafree_loc2(c)

calcium
Qe_Cafree(c) = Qpw_loc2(c)

D_Cafree(c) = ((Exp(((1 / Qe_Cafree(c)) − (1 / Qd)) * KoA_Cafree) − 1) /

(Exp(((1 / Qe_Cafree(c)) − (1 / Qd)) * KoA_Cafree) − (Qe_Cafree(c) /

Qd))) * Qe_Cafree(c)

Jdiff_Cafree(c) = D_Cafree(c) * dC_Cafree(c)

Rates of calcium-citrate
Rate_CaCi_loc2(c) = C_CaCi_loc2(c) * Qpw_loc2(c)

complexes, free citrate, and
Rate_Cifree_loc2(c) = C_Cifree_loc2(c) * Qpw_loc2(c)

free calcium entering the
Rate_Cafree_loc2(c) = C_Cafree_loc2(c) * Qpw_loc2(c)

dialyzer

Read current ultrafiltration
UFR(c) = Application.WorksheetFunction.VLookup(time(c), rng_UFR, 2, True) /

rate
(60000)

Concentration constructs
constr_Rate_CaCi_loc3(c) = Rate_CaCi_loc2(c) + Jdiff_CaCi(c)

(for solutes leaving blood
constr_C_CaCi_loc3_unequ(c) = constr_Rate_CaCi_loc3(c) / (Qpw_loc2(c) −

outlet) for calculating
UFR(c))

convective flux
constr_Rate_Cifree_loc3(c) = Rate_Cifree_loc2(c) + Jdiff_Cifree(c)

constr_C_Cifree_loc3_unequ(c) = constr_Rate_Cifree_loc3(c) / (Qpw_loc2(c) −

UFR(c))

constr_Rate_Cafree_loc3(c) = Rate_Cafree_loc2(c) + Jdiff_Cafree(c)

constr_C_Cafree_loc3_unequ(c) = constr_Rate_Cafree_loc3(c) /

(Qpw_loc2(c) − UFR(c))

Concentrations used for
C_CaCi_forconvection(c) = (C_CaCi_loc2(c) + 2 *

calculating convective
constr_C_CaCi_loc3_unequ(c)) / 3

losses
C_Cifree_forconvection(c) = (C_Cifree_loc2(c) + 2 *

constr_C_Cifree_loc3_unequ(c)) / 3

C_Cafree_forconvection(c) = (C_Cafree_loc2(c) + 2 *

constr_C_Cafree_loc3_unequ(c)) / 3

CONVECTIVE FLUXES of
Jconv_Cafree(c) = −C_Cafree_forconvection(c) * UFR(c)

free calcium, calcium-citrate
Jconv_CaCi(c) = −C_CaCi_forconvection(c) * UFR(c)

complexes, and free citrate
Jconv_Cifree(c) = −C_Cifree_forconvection(c) * UFR(c)

TOTAL FLUXES

Total calcium flux
Jdiff_CaT(c) = Jdiff_CaCi(c) + Jdiff_Cafree(c)

Jconv_CaT(c) = Jconv_Cafree(c) + Jconv_CaCi(c)

Jtotal_CaT(c) = Jdiff_CaT(c) + Jconv_CaT(c)

Total citrate flux
Jdiff_CiT(c) = Jdiff_CaCi(c) + Jdiff_Cifree(c)

Jconv_CiT(c) = Jconv_CaCi(c) + Jconv_Cifree(c)

Jtotal_CiT(c) = Jdiff_CiT(c) + Jconv_CiT(c)

Post-filter concentrations of
Qpw_loc3(c) = Qpw_loc2(c) − UFR(c)

total calcium and total
C_CaT_loc3(c) = ((C_CaT_loc2(c) * Qpw_loc2(c)) + Jtotal_CaT(c)) /

citrate
(Qpw_loc3(c))

C_CiT_loc3(c) = ((C_CiT_loc2(c) * Qpw_loc2(c)) + Jtotal_CiT(c)) /

(Qpw_loc3(c))

Equilibrated post-filter
hc_factor(c) = Qpw_loc3(c) / Qpw_loc2(c)

concentrations of free
C_bindingsites_loc3(c) = C_bindingsites_loc2(c) / hc_factor(c)

calcium, free citrate, and

calcium-citrate complexes
‘ Goal seek for post-filter ionized Ca (loc3)

rng_gs_iCa.Value = gs_iCa_default_loc3

rng_gs_C_CiT.Value = C_CiT_loc3(c)

rng_gs_C_bindingsites.Value = C_bindingsites_loc3(c)

rng_gs_C_CaT.Value = C_CaT_loc3(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_loc3(c) = rng_gs_iCa.Value

C_CaCi_loc3(c) = ((C_Cafree_loc3(c) * C_CiT_loc3(c)) / (K_CaCi +

C_Cafree_loc3(c)))

C_Cifree_loc3(c) = C_CiT_loc3(c) − C_CaCi_loc3(c)

Read current calcium
Rate_Ca_infusion(c) = Application.WorksheetFunction.VLookup(time(c),

infusion rate [l/min]
rng_Ca_infusion, 2, True) / (60000)

Blood and plasma water
Qpw_loc4(c) = Qpw_loc3(c) + Rate_Ca_infusion(c)

flow rates at loc4, and the
Qb_loc4(c) = Qb_loc1(c) + Rate_Ci_infusion(c) − UFR(c) +

plasma water to whole
Rate_Ca_infusion(c)

blood ratio at loc4
R_pw_wb_loc4(c) = Qpw_loc4(c) / Qb_loc4(c)

Post-calcium-infusion
C_CaT_loc4(c) = (C_CaT_loc3(c) * Qpw_loc3(c) + C_Ca_infusion *

concentrations of total
Rate_Ca_infusion(c)) / Qpw_loc4(c)

calcium and total citrate
C_CiT_loc4(c) = (C_CiT_loc3(c) * Qpw_loc3(c)) / Qpw_loc4(c)

Plasma flow rate at loc 4
Qp_loc4(c) = Qp_loc1(c) + Rate_Ci_infusion(c) − UFR(c) +

Rate_Ca_infusion(c)

Protein concentration at
C_prot_loc4(c) = C_prot_loc1(c) / (Qp_loc4(c) / Qp_loc1(c))

loc4

Ratio of plasma to whole
R_p_wb_loc4(c) = Qp_loc4(c) / Qb_loc4(c)

blood at loc4

Hematocrit at location 4
Hct_loc4(c) = (Qb_loc4(c) − Qp_loc4(c)) / Qb_loc4(c)

Theoretical whole blood
C_CaT_loc4_wb(c) = C_CaT_loc4(c) * R_pw_wb_loc4(c)

concentrations of relevant
C_CiT_loc4_wb(c) = C_CiT_loc4(c) * R_pw_wb_loc4(c)

solutes (used for access
C_prot_loc4_wb(c) = C_prot_loc4(c) * R_p_wb_loc4(c)

recirculation)

Equilibrated post-calcium-
hc_factor(c) = Qpw_loc4(c) / Qpw_loc3(c)

infusion concentrations of
C_bindingsites_loc4(c) = C_bindingsites_loc3(c) / hc_factor(c)

free calcium, free citrate,

and calcium-citrate
rng_gs_iCa.Value = gs_iCa_default_loc4

complexes
rng_gs_C_CiT.Value = C_CiT_loc4(c)

rng_gs_C_bindingsites.Value = C_bindingsites_loc4(c)

rng_gs_C_CaT.Value = C_CaT_loc4(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_loc4(c) = rng_gs_iCa.Value

C_CaCi_loc4(c) = ((C_Cafree_loc4(c) * C_CiT_loc4(c)) / (K_CaCi +

C_Cafree_loc4(c)))

C_Cifree_loc4(c) = C_CiT_loc4(c) − C_CaCi_loc4(c)

ECV at beginning of interval
ECV_beg(c) = ECV_end(c − 1)

Amounts of citrate and
N_CiT_ECV_beg(c) = C_CiT_sys_beg(c) * ECV_beg(c)

calcium in ECV at beginning
N_CaT_ECV_beg(c) = C_CaT_sys_beg(c) * ECV_beg(c)

of interval

Amounts of citrate and
N_CiT_infused_interval(c) = Rate_Ci_infusion(c) * C_Ci_infusion * interval

calcium infused during
N_CaT_infused_interval(c) = Rate_Ca_infusion(c) * C_Ca_infusion * interval

interval

Net systemic changes in
dN_CiT_systemic_interval(c) = (Jtotal_CiT(c) * interval) +

total citrate and total
N_CiT_infused_interval(c)

calcium during interval
dN_CaT_systemic_interval(c) = (Jtotal_CaT(c) * interval) +

N_CaT_infused_interval(c)

Amount of citrate in ECV at
N_CiT_ECV_end_noMETnoG(c) = N_CiT_ECV_beg(c) +

end of interval, not
dN_CiT_systemic_interval(c)

considering citrate

generation or metabolism

Amount of total calcium in
N_CaT_ECV_end_prebuffering(c) = N_CaT_ECV_beg(c) +

ECV at end of interval, not
dN_CaT_systemic_interval(c)

considering buffering. Note

that this is the unbuffered

amount for this particular

interval, but it is the

buffered amount that is

carried forward to the

beginning of the next

interval, which will be

different if KMP is not equal

to 0.

UF_interval(c) = UFR(c) * interval

Vol_Ci_infusion_interval(c) = Rate_Ci_infusion(c) * interval

Vol_Ca_infusion_interval(c) = Rate_Ca_infusion(c) * interval

ECV at end of interval
ECV_end(c) = ECV_beg(c) − UF_interval(c) + Vol_Ci_infusion_interval(c) +

Vol_Ca_infusion_interval(c)

Citrate generation during
G_Ci_interval(c) = ((Rate_G_Ci * interval) / (24 * 60)) / (192.12352)

interval

Amount of citrate in ECV at
N_CiT_ECV_end_noMET(c) = N_CiT_ECV_end_noMETnoG(c) +

end of interval, considering
G_Ci_interval(c)

citrate generation but not

metabolism

Citrate concentration in ECV
C_CiT_ECV_end_noMET(c) = N_CiT_ECV_end_noMET(c) / ECV_end(c)

at end of interval,
average_C_CiT_sys_interval(c) =

considering citrate
WorksheetFunction.Average(C_CiT_ECV_end_noMET(c),

generation but not
C_CiT_sys_beg(c))

metabolism

Amount of citrate
N_Ci_metabolized_interval(c) = N_CiT_ECV_end_noMET(c) −

metabolized during interval
(average_C_CiT_sys_interval(c) * Exp(−k_Ci * interval) *

WorksheetFunction.Average(ECV_end(c), ECV_beg(c)))

Amount of citrate in ECV at
N_CiT_ECV_end(c) = N_CiT_ECV_end_noMET(c) −

end of interval, considering
N_Ci_metabolized_interval(c)

generation and metabolism

Total systemic citrate conc.
C_CiT_sys_end(c) = N_CiT_ECV_end(c) / ECV_end(c)

at end of interval

Mobilization/sequestration
MCa(c) = −((Jdiff_CaT(c) * interval) + N_CaT_infused_interval(c)) * KMP

of calcium during interval

Total systemic calcium
C_CaT_sys_end(c) = (N_CaT_ECV_end_prebuffering(c) + MCa(c)) /

concentration at end of
ECV_end(c)

interval

ECV contraction factor
ECV_contractionfactor_interval(c) = ECV_beg(c) / ECV_end(c)

Goal seek for systemic
rng_gs_iCa.Value = gs_iCa_default_sys

ionized Ca at beginning of
rng_gs_C_CiT.Value = C_CiT_sys_beg(c)

interval
rng_gs_C_bindingsites.Value = C_bindingsites_sys_beg(c)

rng_gs_C_CaT.Value = C_CaT_sys_beg(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_sys_beg(c) = rng_gs_iCa.Value

+1 in order to fill all the
Loop Until c = req_iterations − req_iterations_post + 1

parameters for the end-of-
c = c − 1 ‘ See note in the line above

HD time point that would

not otherwise get

calculated in the post-HD
GoTo post_HD_iterations

iterations (such as pre-

/post-filter values). Then,

the counter is decreased by

one and and the program

flow routed to the post-HD

iterations. Since these

parameters from the

additional iteration will not

be overwritten, they can be

used for plotting/reporting.

POSTDIALYTIC
post_HD_iterations:

ITERATIONS (COMMON TO

ALL SIMULATIONS)

Set interval length
interval = interval_post

c = c + 1

time(c) = time(c − 1) + interval_intra

GoTo loop_post_HD

Do

c = c + 1

time(c) = time(c − 1) + interval

loop_post_HD:

Total systemic calcium and
C_CaT_sys_beg(c) = C_CaT_sys_end(c − 1)

citrate concentrations at
C_CiT_sys_beg(c) = C_CiT_sys_end(c − 1)

beginning of interval

Systemic concentration of
C_prot_sys_beg(c) = C_prot_sys_beg(c − 1) *

total protein
ECV_contractionfactor_interval(c − 1)

Systemic concentration of
C_bindingsites_sys_beg(c) = (12 * C_prot_sys_beg(c) / 69000) * 1000

binding sites at beginning

of interval

Systemic hematocrit at
Hct_sys(c) = Hct_sys(c − 1) / (Hct_sys(c − 1) + ((1 − Hct_sys(c − 1)) /

beginning of interval
ECV_contractionfactor_interval(c − 1)))

ECV at beginning of interval
ECV_beg(c) = ECV_end(c − 1)

Amounts of citrate and
N_CiT_ECV_beg(c) = C_CiT_sys_beg(c) * ECV_beg(c)

calcium in ECV at beginning
N_CaT_ECV_beg(c) = C_CaT_sys_beg(c) * ECV_beg(c)

of interval

Amounts of citrate in ECV at
N_CiT_ECV_end_noMETnoG(c) = N_CiT_ECV_beg(c)

end of interval, not

considering citrate

generation or metabolism

Amount of total calcium in
N_CaT_ECV_end_prebuffering(c) = N_CaT_ECV_beg(c) +

ECV at end of interval, not
dN_CaT_systemic_interval(c)

considering buffering. Note

that this is the unbuffered

amount for this particular

interval, but it is the

buffered amount that is

carried forward to the

beginning of the next

interval, which will be

different if KMP is not equal

to 0.

ECV at end of interval
ECV_end(c) = ECV_beg(c)

Citrate generation during
G_Ci_interval(c) = ((Rate_G_Ci * interval) / (24 * 60)) / (192.12352)

interval

Amount of citrate in ECV at
N_CiT_ECV_end_noMET(c) = N_CiT_ECV_end_noMETnoG(c) +

end of interval, considering
G_Ci_interval(c)

citrate generation but not

metabolism

Citrate concentration in ECV
C_CiT_ECV_end_noMET(c) = N_CiT_ECV_end_noMET(c) / ECV_end(c)

at end of interval,
average_C_CiT_sys_interval(c) =

considering citrate
WorksheetFunction.Average(C_CiT_ECV_end_noMET(c),

generation but not
C_CiT_sys_beg(c))

metabolism

Amount of citrate
N_Ci_metabolized_interval(c) = N_CiT_ECV_end_noMET(c) −

metabolized during interval
(average_C_CiT_sys_interval(c) * Exp(−k_Ci * interval) *

WorksheetFunction.Average(ECV_end(c), ECV_beg(c)))

Amount of citrate in ECV at
N_CiT_ECV_end(c) = N_CiT_ECV_end_noMET(c) −

end of interval, considering
N_Ci_metabolized_interval(c)

generation and metabolism

Total systemic citrate conc.
C_CiT_sys_end(c) = N_CiT_ECV_end(c) / ECV_end(c)

at end of interval

Mobilization/sequestration
MCa(c) = −((Jdiff_CaT(c) * interval) + N_CaT_infused_interval(c)) * KMP

of calcium during interval

Total systemic calcium
C_CaT_sys_end(c) = (N_CaT_ECV_end_prebuffering(c) + MCa(c)) /

concentration at end of
ECV_end(c)

interval

ECV contraction factor
ECV_contractionfactor_interval(c) = ECV_beg(c) / ECV_end(c)

Goal seek for systemic
rng_gs_iCa.Value = gs_iCa_default_sys

ionized Ca at beginning of
rng_gs_C_CiT.Value = C_CiT_sys_beg(c)

interval
rng_gs_C_bindingsites.Value = C_bindingsites_sys_beg(c)

rng_gs_C_CaT.Value = C_CaT_sys_beg(c)

rng_gs_cubic.GoalSeek Goal:=0, ChangingCell:=rng_gs_iCa

C_Cafree_sys_beg(c) = rng_gs_iCa.Value

Loop Until c = req_iterations

The relevant teachings of all patents, patent applications and references cited herein are incorporated by reference in their entirety.

While this invention has been particularly shown and described with references to example embodiments thereof, it will be understood by those skilled in the art that various changes in form and details may be made therein without departing from the scope of the invention encompassed by the appended claims.

	Number	Date	Country
	61335546	Jan 2010	US
	61268871	Jun 2009	US

	Number	Date	Country
Parent	12817390	Jun 2010	US
Child	14463000		US

Methods of Regional Citrate Anticoagulation Dialysis

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