The physics of non-premixed flames is by now well understood. In fact, the structure of such flames has been analyzed mathematically in its entirety in a masterly article by Lilian (1974), which concluded the theoretical work that was initiated by the seminal work of Burke and Schumann (1928). This line of work has established that, for large activation energies (i.e. for all practical flames), the location of the flame as well as several of its properties (e.g. maximum temperature, fuel mass flow rate etc.) are basically determined by mixing. The reactants diffuse into each other and the non-premixed flame establishes itself pretty much like a sheet at the location where the two reactants mix at stoichiometric proportion. This introduces a coupling between the mechanical and chemical characteristics of the flame and its morphology that complicates flame management in practical burners. It is e.g. a matter of everyday experience that by increasing the fuel flow rate of a jet flame we also affect its height, or that there are limitations as to how close to solid surfaces non-premixed flames can sit because of the need for mixing to work.
The early realization that flames contain ions (Lewis (1931), Calcote (1957)) introduced the intriguing possibility of electric control of flames. If one can act on the dilute plasma that the flame generates with appropriately tailored electric fields, it is conceivable that one could affect flame morphology (in a manner that would e.g. be favorable for the purposes of heat transfer) in a way that would be independent of the mechanical and chemical characteristics of the reactive flow. It is by now well-established (Goodings et al. 1979 I & II), that although flames are not hot enough to generate thermal plasmas, some of the combustion intermediates are charged. Exactly because of their chemical nature, these ions are called chemi-ions. Their precise nature has been discoursed intensely in the literature, but the mechanism described in detail in the recent paper by Belhi et al. (2010) that involves the formation of HCO+ and H3O+ seems to be gaining acceptance.
A first line of work in the context of electrostatic manipulation of combustion was the one that related to the combustion of electrostatically charged sprays and solid-particle suspensions. The idea was proposed by Thong and Weinberg (1971) and was followed up by several researchers (Ueda et al., 2002, Okai et al. 2004, Yamamshita and Imamura 2008, Anderson et al. 2008), among which A. Gomez and his collaborators at Yale have provided the most long-lasting and impactful line of work on electrospray combustion (Tang and Gomez (1994), Kyritsis et al. (2004), Lenguito et al. (2014)). Then, there has been substantial work on plasma-assisted combustion (Papac and Dunn-Rankin (2007), Ju and Sun (2015)) although it is realized that introduction and effective control of plasmas requires a very specific set of technologies and that the results, especially as it relates to soot generation, are not always favorable.
Notably, technologies that would involve acting directly on the chemi-ions, without the need for a charged liquid fuel or the generation of the plasma have received very little attention. However, recent analyses have provided data that suggest that this might be possible. In a series of elegant experiments, S. H. Chung and his collaborators showed that electrostatics can affect jet-flame stabilization in a pretty substantial manner (Kim et al. 2012). Laminar flame stabilization was also studied numerically by Belhi et al. (2010), who provided a chemical mechanism for the generation of chemi-ions that was adapted to DNS of laminar flames. The proposed model was somewhat simplified compared to the detailed chemistry proposed in the early work of Goodings et al. (1979 I & II), who established chemi-ions as the main mechanism of charge generation.
In the present disclosure, we explore the possibility of control of the location of a non-premixed counterflow flame through electrostatic manipulation. Of particular importance is whether the flame location can be determined through electrostatic actuation without altering the macroscopic chemical and mechanical characteristics of the flame (overall mixture strength and imposed strain rate). To this end, a counterflow, N2-diluted, methane-oxygen flame was studied in an appropriately configured experimental burner and a computational framework was established in ANSYS-Fluent.
The terms “invention,” “the invention,” “this invention” and “the present invention” used in this patent are intended to refer broadly to all of the subject matter of this patent and the patent claims below. Statements containing these terms should be understood not to limit the subject matter described herein or to limit the meaning or scope of the patent claims below. Embodiments of the invention covered by this patent are defined by the claims below, not this summary. This summary is a high-level overview of various aspects of the invention and introduces some of the concepts that are further described in the Detailed Description section below. This summary is not intended to identify key or essential features of the claimed subject matter, nor is it intended to be used in isolation to determine the scope of the claimed subject matter. The subject matter should be understood by reference to appropriate portions of the entire specification of this patent, any or all drawings and each claim.
According to certain embodiments of the present disclosure, a method of manipulating a flame can include generating a stable flame between a fuel source and an oxidizer source, generating an electrostatic field proximate to one of the fuel source and the oxidizer source by way of one or more electrodes, and changing at least one of a position and a shape of the flame by applying a voltage to one or more of the one or more electrodes. The fuel source and the oxidizer source may be arranged in a counter-flow arrangement. The one or more electrodes may include a first electrode positioned proximate to, or across, one of the fuel and oxidizer sources. In some cases, the one or more electrodes may alternatively, or in addition, include a second electrode positioned proximate to, or across, the other of the fuel and oxidizer sources.
According to certain other embodiments of the present disclosure an electrostatically controlled burner can include a fuel source and an oxidizer source arranged proximate to the fuel source. One or more electrodes can be positioned proximate to at least one of the fuel source and the oxidizer source, and configured to produce an electrostatic field between the fuel source and the oxidizer source sufficient to change a shape of a flame produced between the fuel source and the oxidizer source. In some cases, the fuel source and the oxidizer source can be arranged in a counter-flow arrangement. A coolant chamber may be connected with one of the fuel source and the oxidizer source and configured to cool one of the fuel source and the oxidizer source. A shroud nozzle may be connected with one of the fuel source and the oxidizer source and configured to emit a gaseous shroud between the fuel source and the oxygen source and arranged to protect a flame maintained therebetween.
In some cases, an electrostatically controllable burner can also include a first electrode and a second electrode, where the first electrode is positioned proximate to the oxidizer source and the second electrode is positioned proximate to the fuel source. A power supply can be connected to at least one of the first and second electrode such that the power supply generates a voltage difference between the first and second electrode sufficient to generate the electrostatic field.
The subject matter of embodiments of the present disclosure is described here with specificity to meet statutory requirements, but this description is not necessarily intended to limit the scope of the claims. The claimed subject matter may be embodied in other ways, may include different elements or steps, and may be used in conjunction with other existing or future technologies. This description should not be interpreted as implying any particular order or arrangement among or between various steps or elements except when the order of individual steps or arrangement of elements is explicitly described.
Apparatus
An axisymmetric, laminar methane-oxygen, N2-diluted flame can be established between the fuel source 104 and oxidizer source 102 forming a burner that can be used similarly with hydrocarbon gaseous fuels (ethane, propane, butane), vaporized hydrocarbons, as well as oxygenated fuels (alcohols, biodiesel, etc.)
At the oxidizer source 102, an oxidizer stream 122 can be delivered from a reservoir 120 which may include oxygen diluted with nitrogen. The oxidizer stream 122 is supplied into an oxidizer inlet 124 to the upper oxidizer chamber 126. The oxidizer stream 122 flows through a first glass bead bed 130 and ultimately to the oxidizer nozzle exit 134. A fuel stream 152 from a fuel reservoir 150 flows into the fuel source 104 via a fuel inlet 154. The fuel stream 152 can include a mixture of fuel and nitrogen. The fuel stream 152 passes through the upper fuel chamber 156, through the second glass bead bed 160 to the fuel nozzle exit 164. Both nozzle exits 134, 164 can be approximately 15 mm in diameter and the gap between them can be controllable, e.g. by translating one of the two sources 102, 104 relative to the other. In most of the experimental cases described below, the nozzles were separated by from 15 mm to 20 mm. However, in various embodiments, the nozzle exits 134, 164 may be any suitable size or geometry, and may be spaced at more than 20 mm, or less than 15 mm.
A separate nitrogen stream 166 can flow into a nitrogen chamber 170 through one or more nitrogen inlets 168, 172 and out through a shroud nozzle 174 to act as a gaseous shroud around the fuel nozzle exit 164, in order to protect a flame from interferences from the ambiance. Nitrogen streams, or other suitable inert gas streams, can also be used in order to extinguish a flame. In various embodiments, any suitable non-oxidizing, non-combusting gas may be passed through the shroud nozzle 174 and around the flame to protect the flame.
The oxidizer source 102 was cooled, e.g. by a coolant chamber 112, which takes an inlet coolant stream 116 through a coolant inlet 110 and exhausts an outlet stream 118 through a coolant outlet 114. In some cases, the coolant stream 116 is a water stream. The coolant chamber 112 is bounded by an inner wall 136, outer wall 138, and end walls 140, 148. The coolant chamber 112 can protect the oxidizer source 102 from the heat of a buoyant plume generated by a flame between the two sources 102, 104. In various embodiments, any suitable coolant may be passed around the oxidizer source 102 by way of the coolant chamber 112 to protect the oxidizer source from heat.
Glass bead beds 130, 160 can be used to provide uniform velocity profiles of both fuel and oxidizer at the nozzle exits 134, 164, respectively, and to help prevent flashback. At the oxidizer source 102, the oxidizer stream 122 can flow through the upper oxidizer chamber 126, through a first porous layer 128 and into the first glass bead bed 130, and ultimately out through a second porous layer 132 to the oxidizer nozzle exit 134. At the fuel source 104, the fuel stream 152 can flow through an upper fuel chamber 156, through a third porous layer 158 and into the second glass bead bed 160, and ultimately out through a fourth porous layer 162 into the fuel nozzle exit 164.
Two aluminum plates 142, 180 can be attached to each nozzle exit 134, 164, respectively, in order to act as electrodes and introduce an electric field, thus effectively creating a capacitor between the oxidizer and fuel sources 102, 104. Both plates 142, 180 were drilled and aligned with the nozzle exits 134, 164 to allow the passage of gas flow therethrough. An electrically conducting mesh 144, 184 was placed in the hole of each aluminum plates in order to secure as good of electric-field uniformity as possible. The lower plate 180, i.e. for the fuel source 104, can include peripheral openings 182 for nitrogen gas to pass therethrough, e.g. to be used as a shroud.
DC high voltage was applied between the two plates 142, 180 with a power supply 146 connected to two varying high-voltage power supply of LD-Didactic GmbH connected in series, which provided the capability to vary the applied voltage between 0 to 6 kV. In some cases, the lower plate 180 can be connected with ground 186. This yielded an overall electric field intensity that varied between 0 and 400 V/mm when the distance between the nozzles was about 1.5 cm. The proposed technology is expected to work for electric field strengths on the order of 100-1000 V/mm.
In order to supply gases to the burner 100, oxygen from the oxidizer reservoir 208 was diluted with nitrogen from the carrier gas reservoir 205 by passing the respective gasses through valves 220 and rotarmeters 212, 214 to regulate a mixing rate of the oxygen gas with the nitrogen gas. A mixture of the oxygen gas and nitrogen gas was then supplied to the burner 100. At the same time, CH4 from the fuel reservoir 202 was combined with a flow of nitrogen from the carrier gas reservoir 205 by way of valves 220 and rotarmeters 218, 216 to form the fuel stream 152 which flows into the burner 100 as well. A separate nitrogen stream 166 flows from the carrier gas source to the burner 100. The coolant flow 116 was passed from a coolant source 224, which may be a water source, by way of a valve 226 to the burner, and removed from the burner by way of an outlet stream 118 to an exhaust or drain 222.
The nitrogen, oxygen and methane gases were metered accurately using Matheson rotameters 212, 214, 216, 218; which provided volume flow rate measurements with an estimated error of ±5% as per the specs of the manufacturer. The flame behavior was visualized using Andor's iStar® DH320T intensified CCD camera and a Nikon® D3200 digital video camera.
Experiments were conducted at a constant fuel flow rate and selected oxygen flow rates corresponding to particular inlet oxygen-fuel ratios. In the experiments, the overall equivalence ratio varied from 0.6 to 1.4. The speed at the fuel nozzle varied from 25 to 65 cm/s. The burner operated in the following manner: After setting the fuel and oxygen flow rates, nitrogen was gradually added to the fuel and oxygen stream to maintain a flat flame centered in the burner. The flame behavior within the burner 100 was visualized using one or more cameras 228, e.g., using Andor's iStar DH320T intensified CCD camera and a Nikon D3200 digital video camera.
Computational Methodology
In parallel to experimental observation of the phenomenology of electrostatically manipulated flames, emphasis was placed on the establishment of a high-fidelity computational tool that would enable the analysis of the underlying physics. To this extent, ANSYS® Fluent was used to simulate the phenomena. The phenomenon of electrostatically manipulated flames was analyzed by setting up a computational framework of the electrostatically manipulated reactive flow in ANSYS Fluent (ANSYS Release 16.0, Help System, ANSYS Fluent Theory Guide. ANSYS Inc., 2015). The purpose of the computational study was to investigate the fundamental distinctive physics associated with the action of electrostatics with a particular emphasis on ionic wind and preferential diffusion.
Governing Equations
To describe a reactive flow, the conservation principles were applied for mass, momentum, and energy, and an evolution equation was employed for each chemical species involved. These governing equations were solved computationally using the ANSYS-Fluent platform. The reactive flow was modeled as steady, laminar flow using an axisymmetric computational domain. In our calculations, body forces were ignored with the exception of the electrostatic one, and so were thermal diffusion and radiative heat transfer.
The mass conservation equation for a steady flow is:
∇·(ρu)=0.
∇· is divergence. In cylindrical coordinates,
for any vector quantity ξ. ρ is the mixture mass density and u the mixture velocity vector. Additionally, linear momentum conservation yields
∇·(ρuuT+pI−τ)=Se,
Here, I is the identity matrix and therefore the above equation can be represented in the radial and axial momentum as
r—momentum:
z—momentum:
The viscous stress tensor τ was calculated in terms of dynamic viscosity μ
τ=−μ(∇u+(∇u)T−⅔(∇·u)I).
In the presence of an electric field, an electric force exerted on the charged molecules must be considered. The term Se represents the electric body force per unit volume applied on the charged species and was calculated as:
Se=qE(n+−n−).
Here, q is the electron charge (q=1.602×10−19 C) and n+ n− represent the concentration of the positively and negatively charge species, respectively. E is the electric field intensity that is related to the electric potential V by
E=−∇V.
Since the number density of the charged species is particularly low, the effect of the space charge on the electric field is neglected and in the current work, the electric field intensity is assumed to be constant. The electric field was applied only in the axial-direction of the computational domain, which resulted in a source of the electrical body force Se in the axial-momentum equation only.
The species evolution equation for species i is
∇·(ρuYi+Jim+Jie)=
In a mixture that consists of N species, there are N−1 independent species evolution equations, because the mass fractions of all species should add up to unity. Again, the right-hand side term is due to creation or depletion of species i from the chemical reactions and Jim is the diffusive mass flux vector that in this work is limited to Fickian diffusion, depends on the mass fraction gradient only,
Jim=−ρDi∇Yi, i=1, . . . ,N,
where Di is the species mixture-average diffusion coefficient in the mixture, which is calculated using
Here, Dki are the binary diffusion coefficients of species k toward species i, computed using the approximation of Champan-Enskog. An additional mass flux Jie is generated when an electric field is applied to the charged species that is determined by their electric mobility κ, which is given by
Jie=siρκiYiE, i=1, . . . ,N.
This term affects only the charged species, therefore si=0 for neutral species, −1 or +1 for negatively or positively charged species, respectively. There are no definitive expressions for the ionic mobility of the chemi-ions under consideration here, so the mobility of ions was considered to be 10−3 V−1m2s−1 and the diffusion coefficients of ions is assumed to be equal to that of corresponding neutral species.
The energy conservation equation can be expressed in different forms in terms of enthalpy, internal energy, or temperature. In this study the energy equation is solved for the specific internal energy e of the mixture
The mixture is assumed to be an ideal gas, with temperature-dependent mass-based specific internal energy e=e(T). The total heat flux q is calculated as
The first term of the heat flux originates from the Fourier's law, where λ is the thermal conductivity and the second term describes energy flux due to the diffusive mass fluxes. hi is the mass-based specific enthalpy for species i.
Chemi-Ion Kinetics for CH4/Air Combustion
In the modeling above, we have considered only three charged species: HCO+, H3O+, and e−, which have been shown in pre-existing literature to constitute a good representation of positively and negatively charged species in the gaseous medium. The three ionic reactions (I-III) were added to the chemical reaction mechanism, with the Arrhenius-kinetics parameters shown in Table 1. Chemi-ion generation did not provide feedback back to the kinetics of neutral species. The chemistry of charged species was first solved and then, chemi-ion concentrations were calculated using the parameters of Table 1.
Computational Approach
In order to obtain the steady structure of a non-premixed, counter-flow flames, a second-order integrating scheme using ANSYS-Fluent 16.0 was used. The computational domain 300 is shown in
The boundary conditions for the 2-D axisymmetric domain 300 are provided in Table 2. The velocity at the exit of the nozzles is uniform. Also, the wall of the oxidizer nozzle is kept at low temperature (300 K), since in the experimental burner the oxidizer nozzle is cooled by water. The electric field in the computation domain is applied only in the axial direction.
The detailed GRI-Mech 3.0 mechanism (Smith, G. P., Golden, D. M., Frenklach, M., Moriarty, N. W., Eiteneer, B., Goldenberg, M., Bowman, C. T., Hanson, R. K., Song, S., Gardiner, W. C., Jr., Lissianski, V. V., and Qin, Z. http://www.me.berkeley.edu/gri_mech/, 1999) was used in order to model the kinetics. This mechanism uses 53 neutral species, to which the three chemi-ions HCO+, H3O+ and e− were added as per the analysis above in order to ultimately have N=53+3=56 species and 325 reactions among neutral species, to which three reactions including chemi-ions were added in order to ultimately have J=325+3=328 reversible reactions. The reaction mechanism used in the simulation is listed in the Appendix. In this work, the computational domain has been discretized using 140775 nodes via employing a uniform grid of size 1×10−4 m. A 24-core, 2.7 GHz Hewlett-Packard computer was used in order to perform the necessary computations.
Flame morphology was studied in terms of a set of three parameters:
1. Overall strain rate of the flame (K). This was controlled by the mass flow rates of the counter-flowing streams; it essentially determines the Damkohler number and controls extinction for steady flames like the one at hand.
2. Overall mixture strength/equivalence ratio (φ). This depends on the mass flow rates of fuel and oxidizer and determines the relative position of the non-premixed flame sheet and the stagnation plane in the counter-flow flame.
3. Electric field (E). This is viewed as an independent way to control flame morphology that does not depend on the mechanical/chemical properties of strain and overall mixture strength. In this manner, we checked the hypothesis that the flame can be positioned in a manner that can be varied through electrostatics, even for constant overall strain rate and mixture strength.
These three parameters were controlled as follows: From the mass flow rates of the mixture components at each nozzle, the molecular mass of the mixture was calculated as:
Where yk and Mk are the mass fraction and molecular mass of species k. The mass flow rate of each gas is metered independently, therefore the mass fraction yk of each gas is known. The density of the ideal gas under ambient conditions of room temperature T and atmospheric Pressure Patm was then calculated as:
Where the subscript n could indicate either the fuel or the oxidizer stream (n=oxy or fuel) and
Finally the strain rate K at the stoichiometric surface (where the flame sits) is estimated using the approximation (Seshadri and Williams 1978):
The overall equivalence ratio φ is calculated from the mass flow rates of the fuel and the oxidizer:
Where (F/O) is the Fuel to oxidizer ratio and (F/O)stoich the stoichiometric ratio.
As for the electric field, this was controlled by the applying a potential difference Δϕ between the two parallel plates that were separated by the distance l and calculating an “average” field strength as:
In this manner the effect of the dilute plasma that the chemi-ions generate on the local electric field is neglected, which is a reasonable approximation given that the overall degree of ionization caused by the chemi-ions is expected to be small (Belhi et al., 2010).
The effect of the application of a DC electrostatic field on the behavior of the non-premixed laminar flame is shown schematically in
As shown in
The important finding of the study of flame morphology is salient: The position of the flame in the mixing layer can be controlled by electrostatics, without any variation of the chemical/mechanical characteristics of the flame.
Notably, as the voltage reached −3 kV, the electrostatic force was capable to attract the flame completely to the side of the negative plate without extinction. It is remarkable that electrostatics seems to be able to “push” the flame to a location where there is seemingly very little oxidizer! This is potentially very interesting for practical applications, where intense heat transfer to a solid surface is necessary, as
An interesting interaction of the electrostatic effect with buoyancy is also evident. For example, the flame is attracted to the negative electrode in a manner that starts from the edges, thus forming a “dome”-shaped flame (
It is also noted that the morphology of the flame is not symmetric with respect to polarity. The “dome”-shape flame of
The capability to control flame position through electrostatic action, without any real reference to the chemical and mechanical characteristics of the flame is quantitatively demonstrated in
Computational Results
The detailed chemical mechanism GRI-Mech 3.0 was used to compute the flame structure in the computational domain 704, which is similar to the half computational domain 300 shown in
More results showing the charged species on flame structure are provided in
As discussed above, the electric field affects the reactive flow in two distinct ways: First, it generates the body force Se that affects the momentum balance. Then it introduces an additional form of diffusive mass flux Jei, the so-called ambipolar diffusion. The results shown in
Comparison of Experimental with Computational Results
The effect of the application of a uniform electric field on the structure of the non-premixed laminar flame is shown in
When the flame is ignited and no electric field is applied, the flame stabilizes almost in the middle between the two nozzles. The applied voltage affects position and morphology dramatically. It is noted that, without changing any of the mechanical and chemical characteristics of the flame (speed at the nozzles, mass fractions of methane, oxygen, and nitrogen etc.) we are able to position the flame at practically any location in the gap between the two nozzles just by controlling electric field intensity and direction. The flame was attracted to the negative plate in all cases, which indicates that the flame acts as electrostatically positive. This indicates that the majority of the charged species are positively charged and it agrees with the assumption that the electrons have a very large diffusion coefficient and leave the flame region fast. It is noted that our finding is interestingly different from results previously reported by the PI, where flames around charged droplets were shown to be attracted to the droplet when the droplet was positive. This was probably due to the existence of soot particles in the droplet flame, where electrons arrived thus generating a collection of heavy, negatively charged particles that determined the response when the electric field was applied.
The effect of application of the electric field is further studied in
The motion of the flame that is caused by the application of a voltage of 5 kV seems to be slightly larger in the computations that in the experiments, which is in agreement with
Potential Applications
It has been shown that the chemi-ions contained in the flames generated by logistic fuels generate a dilute plasma that can be manipulated by electric fields (on the order of intensity of 100-1000 V/mm) in a manner that allows positioning the flame virtually on top of solid surfaces from which the fuel is injected. Contrary to what happens in classical fuel injection, the flame is not a corrugated surface the exact location of which is dictated by turbulent mixing of the reactants but rather a heat-releasing sheet that sits on top of the solid surface. It is noted that the need for mixing to occur means that classical burners that are used for heat generation have to be spacious exactly in order to allow for the mixing to happen. The proposed technology alleviates this caveat. Through electrostatics, it is possible to exert a force on the flame and attach it to solid surfaces, as shown in, e.g.
Preliminary Model
The effect of electrostatics on flame structure was initially modeled as described below. A flame system can be modeled as steady, compressible and laminar reacting flow of density p and velocity components in axial uz and radial ur directions. The description of the problem is governed by the conservation equations in a cylindrical coordinates where z and r represent axial and radial coordinates, respectively. It is stressed that the purpose of these introductory computations was not to introduce electrostatics in the reactive Navier-Stokes, but rather to establish an easy-to-use computational tool and characterize its accuracy against previous detailed studies of the particular flames.
The mass continuity and momentum equations that were solved by the code can be written as follows:
Where P is the pressure that is calculated by the ideal gas law. The transport equation for evolution of chemical species Xk (mass fraction), Yk (mole fraction), k=1, 2, . . . n, in the flame is:
Vk is the diffusion velocity, the index m in the diffusion coefficient Dkm, indicates a different species m diffuses into species k which was calculated using the Maxwell-Stefan model; Mk is the molecular mass of a single species and {dot over (ω)}k represent its molar production rate per unit volume through chemical reaction.
The energy equation is:
In this equation T denotes the temperature, hko is the specific enthalpy of formation of species k, hk is the specific enthalpy of species navier stroke, Cv is the specific heat under constant volume of the gaseous mixture and λ its thermal conductivity.
The boundary conditions for the computation are listed below in Table 3.
In order to calculate flame chemistry, the detailed GRI 3.0 CH4-air mechanism (Smith et al.) was imported to FLUENT, which contained 53 species that underwent 325 reactions. A uniform grid size of Δx=1×10−5 m is used to for the computational.
Verification of the Preliminary Model
An ANSYS-Fluent-based computational model was developed for the study of the experimentally observed flames by coupling the code with detailed kinetics and verifying against the computational results of Smooke et al. (1986) which calculated a flame without electrostatic manipulation. The same chemical kinetic schemes and boundary conditions were used in both computations. In the computation of Smooke et al., the fuel was introduced through a stream that extended infinitely and had with a mass flux of 2.40·10−2 g/cm2·s, which was emulated in the nozzle of the experimental burner. The mass fraction of fuel and diluent were YCH
Temperature and mass fraction distributions based on the preliminary model described above are shown in
Each comparison described above was performed with respect to two aspects. First,
Computational Calculation of the Properties
The Compact notation embodied in the equations of the previous sections is used in order to solve chemical kinetics problems using CHEMKIN® (CHEMKIN-CFD for FLUENT 20112, Reaction Design: San Diego, 2013) coupled with ANSYS-Fluent. A detailed reaction mechanism can be written by considering all the elementary reactions and the chemical species (molecules, atoms, and free radicals) that take part in the overall reaction process. Fluent can read a mechanism file in CHEMKIN Format by importing three files: CHEMKIN mechanism file, the thermodynamics database file and transport data file.
An example of input file to the CHEMKIN Mechanism File for a hydrogen-oxidation reaction shown in
The values of coefficients a1-a7 are given in the format shown in
Finally, the transport properties file was used to evaluate the viscosities, thermal conductivities, diffusion coefficients, and thermal diffusion coefficients for any species in the mixture.
Different arrangements of the components depicted in the drawings or described above, as well as components and steps not shown or described are possible. Similarly, some features and sub-combinations are useful and may be employed without reference to other features and sub-combinations. Embodiments of the disclosure have been described for illustrative and not restrictive purposes, and alternative embodiments will become apparent to readers of this patent. Accordingly, the present disclosure is not limited to the embodiments described above or depicted in the drawings, and various embodiments and modifications may be made without departing from the scope of the claims below.
The present application is a continuation application of U.S. application Ser. No. 15/739,641, filed Dec. 22, 2017, now U.S. Pat. No. 10,677,455, issued Jun. 9, 2020, which is the U.S. national stage of PCT/US2016/039376, filed Jun. 24, 2016, which claims benefit of U.S. Provisional Application No. 62/184,005, filed Jun. 24, 2015, all of which are hereby incorporated by reference in their entirety for all purposes.
Number | Name | Date | Kind |
---|---|---|---|
3358731 | Donnelly et al. | Dec 1967 | A |
3416870 | Wright | Dec 1968 | A |
4439980 | Biblarz et al. | Apr 1984 | A |
4875850 | Cagnon et al. | Oct 1989 | A |
10190767 | Karkow | Jan 2019 | B2 |
20120023950 | Weeks et al. | Feb 2012 | A1 |
20130071794 | Colannino | Mar 2013 | A1 |
20130156968 | Petorak et al. | Jun 2013 | A1 |
20160363315 | Colannino | Dec 2016 | A1 |
Number | Date | Country |
---|---|---|
2016210336 | Dec 2016 | WO |
Entry |
---|
U.S. Appl. No. 15/739,641, “Non-Final Office Action”, dated Oct. 17, 2019, 10 pages. |
U.S. Appl. No. 15/739,641, “Notice of Allowance”, dated Apr. 9, 2020, 5 pages. |
PCT/US2016/039376, “International Preliminary Report on Patentability”, dated Jan. 4, 2018, 7 pages. |
PCT/US2016/039376, “International Search Report and Written Opinion”, dated Sep. 14, 2016, 10 pages. |
Number | Date | Country | |
---|---|---|---|
20200300457 A1 | Sep 2020 | US |
Number | Date | Country | |
---|---|---|---|
62184005 | Jun 2015 | US |
Number | Date | Country | |
---|---|---|---|
Parent | 15739641 | US | |
Child | 16890083 | US |