This application claims the benefit of priority under 35 U.S.C. §119 of German Patent Application DE 10 2005 061 439.6 filed Dec. 22, 2005, the entire contents of which are incorporated herein by reference.
The invention relates to respirators (also known as ventilators) generally and more particularly to a method, system and device for the determination of leaks in a device for supplying a patient with breathing gas, which has at least one analyzing unit and one measuring device for determining the respiratory tract pressure.
In almost all respirators, leaks can occur, which are either system-related, as a result of a mask that has not been put on tightly enough, or patient-related, for example, in the form of a fistula. This leak generally depends on the positive pressure respiration and on the respiration method used. A distinction is to be made here between pressure-controlled and volume-controlled respiration.
In volume-controlled respiration, the inspiration takes place as predetermined by the stroke volume and by the time curve of the volume flow, and the respiratory tract pressure is dependent upon the volume flow and the stroke volume. The level of the respiratory tract pressure essentially depends on the lungs of the patient and also on the breathing efforts of the patient. In the volume-controlled respiration, it is necessary to monitor the upper respiratory tract pressure in order to prevent a lung of the patient from becoming damaged due to too high pressures. The rigid predetermination of the time curve of the volume flow has a problematic effect, if the patient develops his/her own activity during the breathing and thus wants to determine the volume flow himself/herself.
Pressure-controlled respiration takes place as predetermined by the time curve of the respiratory tract pressure. In this case, so much breathing gas is supplied until a predetermined respiratory tract pressure is reached. In pressure-controlled respiration, the volume flow and the stroke volume are monitored. If the breathing gas for respirating a patient is provided via a fan as a pressure source, then the respiration usually takes place as predetermined by the pressure curve, since the respiratory tract pressure, but not the volume flow can be adjusted via a regulation of the speed of the fan in a relatively simple way. The possibility of also predetermining the stroke volume here is desirable.
To compensate for a leak in pressure-controlled respiration, a so-called compensating gas flow is added, so that the respiratory tract pressure can be maintained at the preselected pressure level.
In the volume-controlled respiration, the added compensating gas flow should be included in the calculation of the stroke volume. The compensation for a leak by means of adding a compensating gas flow also interferes with the setting of the trigger thresholds, with which an inspiration stroke is triggered.
Since the system leak has different effects on the system functionalities of the respirator, accurate knowledge thereof is important in order to be able to make a suitable compensation. In the prior-art respirators, usually a linear or square root dependence of the leak is based on the respiration pressure.
A square root dependence between a leak and the respiration pressure for a respirator with a fan emerges, for example, from U.S. Pat. No. 6,659,101 B2.
The drawback in this case is that a characteristic curve limited to the square root function can only approximate the different leak forms approximately.
The object of the present invention is thus to provide an improved method for leak compensation and a device for carrying out the method.
According to the invention, a method is provided for the determination of leaks in a device for supplying a patient with breathing gas. The device has at least one analyzing unit and one measuring device for determining the respiratory tract pressure. The method includes recording an inspiration pressure pinsp during an inspiration time Tinsp with the measuring device and varying the inspiration pressure pinspi during consecutive breaths I. Next the method includes determining leak volumes VLi from the product of pinspi and Tinspi in accordance with the equation
VLi=A×pinspiB×Tinspi
while the parameters A and B are determined in the analyzing unit by a regression model with pinsp as the regressor.
The method may also include adding an additive term εi, which takes irregular breathing of the patient into consideration, to the equation for VLi.
Further, the method may also include the step of additionally taking into account the end expiratory pressure peep as another regressor and thus allowing variable expiratory pressures according to the equation
VLi=A(pinspiB·Tinspi+peepiB·Texspi)+εi.
According to another aspect of the invention a system and device are provided for the determination of leaks in a device for supplying a patient with breathing gas. The device includes a means for producing a respiratory pressure curve, a means for switching between an inspiration phase and an expiration phase as well as a measuring device for recording an inspiration pressure pinsp. A means is provided for describing leak volumes VLi from the product of pinspi and Tinspi in accordance with the equation
VLiA×pinspiB×Tinspi
with the parameters A and B to be determined by a regression calculation. A means is provided for determining the leak flow {dot over (V)}L(t) from the positive pressure respiration curve p(t) according to the equation
{dot over (V)}L(T)=A·pB(t)
with the parameters A and B to be determined by a regression calculation.
According to the present invention, instead of a arbitrary parametric function with at least n=2 parameters, an exponential function with two free parameters A and B is used to describe the dynamic pressure dependence of the leak flow. The leak flow amounts to
{dot over (V)}L(T)=A·pB(t) (1)
and the leak volume VL
VL=∫{dot over (V)}L(t)dt=A∫pB(t)dt (2)
The volume balance ΔV generally appears from the equation
ΔV=VL+ε=A∫pB(t)dt+ε, (3)
whereby the summand ε denotes irregular breathing. ΔV is breath-resolved or averaged over several consecutive breaths. In a completely passive, e.g., sedated, patient, ΔV and VL are identical.
In the general case, random positive pressure respiration curves p(t) are assumed. The volume balance and the corresponding respiratory tract pressure curve are measured and are stored for each breath, as is shown, for example, in Table 1.
By means of the model statement according to equation 3
ΔV=A∫pB(t)dt+ε, (4)
the free parameters A and B can be estimated by means of using suitable regression methods. The prerequisite for an estimate is that enough breaths (n≧2) are measured and that the leak volumes and pressure curves, in particular the maximum inspiration pressure, are sufficiently different.
The method can be simplified if each breath is split into N intervals and an average respiratory tract pressure is determined at each of these intervals. The simplification is exact, i.e., a systematic error does not arise if the respiratory tract pressure curve does not deviate from the respective average respiratory tract pressure at the intervals, i.e., if the pressure curve can be described as a step function.
If the simplified case of two intervals (inspiration and expiration) and a step-like pressure curve are taken into account, then p(t)=pinsp during the inspiration phase and p(t)=peep in the expiration phase.
According to Table 2, the volume balance is determined for each breath both for the inspiration and the expiration.
From the general model statement according to equation 4,
ΔV=A·(pinspB·Tinsp+peepB·Texsp)+ε (5)
is obtained after the simplification.
As in the general case, the free parameters A and B can be estimated by means of suitable regression methods. The regression is then two-dimensional with pinsp and peep as regressors. The regression is simpler, if the peep is constant, i.e., if it does not change over the breaths taken into account.
The simplest case is present, if peep=0, since the parameters A and B can be estimated here with linear regression.
According to Table 3, the volume balance and pressure and duration of the inspiration phase are determined for each breath.
From the model statement according to equation 5, the model
ΔV=A·pinspB·Tinsp+ε (6)
is obtained under the simplified marginal conditions (peep=0).
Taking the logarithm of the equation results in
log(ΔV−ε)=log(A·Tinsp)+B log(pinsp) (7)
and thus the possibility of the simple linear regression for determining the parameters A and B.
With idealized, rectangular pressure curve, the respirator produces a constant excess pressure Pinsp at the respiratory tract opening of the patient during the inspiration phase with the duration Tinsp. It is assumed that the applied excess pressure falls back to zero in a sufficiently short time after the exchange in the expiration phase, so that Pexp=0 applies. The excess pressure in the inspiration phase Pinsp is determinant for the leak occurring there with the leak volume VL, which can be caused by an incorrectly fitted respirator mask, a poorly situated tube or an unintended discharge opening. An ith inspiration phase is described by the pressure Pinspi, the inspiration time Tinspi and by the leak volume VLi.
It is assumed that the inspiration pressure Pinsp can vary from breath to breath. Other examples where Pinspi varies from breath to breath are: volume controlled ventilation; and proportional assist ventilation (resp. proportional pressure support). The case of an inspiration pressure that is constant over all breaths taken into account is discussed separately. A measured value each is taken for the pressure Pinspi and the inspiration time Tinspi for each breath i. The leak volume VLi cannot generally be measured, but can only be estimated. The volume balance ΔVi is an estimated value for VLi that is true to expectations and deviates from this only because of physiological irregular breathing εi. The volume balance ΔVi is identical to the leak volume VLi in a passive, e.g., sedated patient.
Irregular breathing ε interferes with a determination of the dependence of the leak volume VL on the inspiration pressure Pinsp. For this reason, the data of the breaths, which are characterized by significant irregular breathing, are discarded. The irregular breathing ε cannot be measured directly. However, since it is correlated with the expiratory volume Vexp, the latter can be used as an indicator of the irregular breathing. The breaths, in which the expiratory volume deviates sharply from the “mean value,” are discarded. A median-based criterion is used in this case: The breaths, in which the current measured value Vexpi deviates from the median of the past m measured values by more than a certain percentage (20%), are eliminated.
According to the simplified model, it is assumed that the dependence of the leak flow on the inspiration pressure Pinsp can be described by means of the exponential function. As in equation 6, the result for the leak volume VLi is:
VLi=A·pinsp
Since the leak volume VLi is not available as a measured value, the volume balance ΔVi, interfered with by irregular breathing εi, is used as an alternative
ΔVi=A·pinsp
The free parameters of the function A and B can be estimated, e.g., by nonlinear regression or more simply using the following method:
The logarithm is taken of equation (9), and a linear equation is obtained
log(ΔVi−εi)−log Tinsp=log A+B log pinsp (10)
in which the irregular breathing εi is no longer additive but is in the logarithm. By means of Taylor expansion and termination after the first term,
log ΔVi−log Tinspi=log A+B log pinspi+εi/ΔVi (11)
is obtained approximately.
The left side can be represented abbreviated by yi and the term log(pinspi) by xi.
It is assumed that the noise term standardized to ΔVi, i.e., residual irregular breathing standardized to the volume balance, Ei=εi/ΔVi, is random and not dependent on pinspi or ΔVi. Simplifying, with a=log A, the result is
yi=a+Bxi+Ei (12)
To determine the constants a and B, only the point of intersection with the y axis and the gradient of the fitted straight lines must be determined. Classical linear regression is suitable for this and yields the following result:
whereby the brackets represent averaged measured values over several breaths.
With the coefficients A and B now known, the leak flow can be calculated directly from the positive pressure respiration
{dot over (V)}L=A·pB(t). (14)
Since the pressure is constant in both the inspiration phase and the expiration phase for the special simplest case,
applies, and the corresponding result for the leak flow is
If the inspiration pressure is constant over all the breaths taken into account, this would be, e.g., the case in conventional respiration with BIPAP at PEEP=0, only two points (zero point and measured point) are available for the regression according to equation 9, through which a fitted curve shall be drawn. Thus, only a linear statement is possible, i.e., the exponent B is arbitrarily The linear statement is given only for the sake of completeness and is not a subject of the present invention.
An exemplary embodiment of the present invention is shown in the drawing and explained in detail below. The various features of novelty which characterize the invention are pointed out with particularity in the claims annexed to and forming a part of this disclosure. For a better understanding of the invention, its operating advantages and specific objects attained by its uses, reference is made to the accompanying drawings and descriptive matter in which preferred embodiments of the invention are illustrated.
In the drawings:
Referring to the drawings in particular,
To the analyzing unit 8 is connected a set point transducer 14 for the inspiration pressure pinsp and for the expiration pressure ppeep, which receives the values selected by the user. The breathing gas flow to the patient 2 is dispensed via a control valve 15, which is connected to a pressure gas source, which is not shown in detail in
All three examples can be equally described by means of the exponential function given according to the present invention. In this way, a greater range of variation of the approximation, which includes both linear and square root as well as parabolic leak forms, is obtained.
While specific embodiments of the invention have been shown and described in detail to illustrate the application of the principles of the invention, it will be understood that the invention may be embodied otherwise without departing from such principles.
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