In this study we aim at demonstrating that kinetic consistent magneto gas
dynamic  algorithms  are  a  valid  for  the  computation  of  the  dynamics  of  incompressible 
conductive flows.  We obtain numerical solutions for the test problems, namely the laminar flow  
inside  a  wall-driven  cavity  and  a  magnetic  driven  pump.    We  show  that  kinetic 
consistent algorithms have a high stability in the solution of convection-dominated flows, due to a 
correct physical modeling of the fluid viscosity and to the possibility of tuning appropriate 
regularization terms on the basis of the physical properties of the fluid.  We show  that  the  
kinetic  consistent  approach  offers  a  stable  basis  for  a  correct  physical description  of  
the  shear  viscosity,  thermal  conduction  and  electric  resistivity  effects  in
incompressible magneto hydrodynamics flows

Chetverushkin, B.

D'Ascenzo, N.

Saveliev, A.

Saveliev, V.

English

In this study we aim at demonstrating that kinetic consistent magneto gas

dynamic  algorithms  are  a  valid  for  the  computation  of  the  dynamics  of  incompressible 

conductive flows.  We obtain numerical solutions for the test problems, namely the laminar flow  

inside  a  wall-driven  cavity  and  a  magnetic  driven  pump.    We  show  that  kinetic 

consistent algorithms have a high stability in the solution of convection-dominated flows, due to a 

correct physical modeling of the fluid viscosity and to the possibility of tuning appropriate 

regularization terms on the basis of the physical properties of the fluid.  We show  that  the  

kinetic  consistent  approach  offers  a  stable  basis  for  a  correct  physical description  of  

the  shear  viscosity,  thermal  conduction  and  electric  resistivity  effects  in

incompressible magneto hydrodynamics flows

UPCommons

Novel kinetic consistent algorithm for the modeling of incompressible conducting flows

UPCommons. Portal del coneixement obert de la UPC

IS - Advanced Models and Methods in CFDNovel Kinetic Consistent Algorithm for the modelling of incompressible conducting flowsVII International Conference on Computational Methods for Coupled Problems in Science and EngineeringCOUPLED PROBLEMS 2017M. Papadrakakis, E. On˜ate and B. Schrefler (Eds)NOVEL KINETIC CONSISTENT ALGORITHM FOR THEMODELING OF INCOMPRESSIBLE CONDUCTING FLOWSB. CHETVERUSHKIN∗, N. D’ASCENZO∗∗† , A.SAVELIEV∗∗††AND V. SAVELIEV∗∗†∗ Keldysh Institute of Applied MathematicsRussian Academy of Science (KIAM RAS)4 Miusskaya sq, 125047 Moscow, Russiae-mail: chetver@imamod.ru, web page: http://www.kiam.ru†Deutsches Elektronen Synchrotron (DESY)85 Notkestrasse, 22607 Hamburg, Germanye-mail: ndasc@mail.desy.de - Web page: http://www.desy.de††Hamburg University85 Notkestrasse, 22607 Hamburg, Germanye-mail: Andrey.Saveliev@desy.de - Web page: http://www.desy.de∗∗ Immanuel Kant Baltic Federal University14 Alexandr Nevsky str., 236016, Kaliningrad, Russiae-mail: saveliev@mail.desy.de - Web page http://www.kantiana.ruKey words: MGD pump, numerical methods, kinetic consistent algorithmsAbstract. In this study we aim at demonstrating that kinetic consistent magneto gasdynamic algorithms are a valid for the computation of the dynamics of incompressibleconductive flows. We obtain numerical solutions for the test problems, namely the laminarflow inside a wall-driven cavity and a magnetic driven pump. We show that kineticconsistent algorithms have a high stability in the solution of convection-dominated flows,due to a correct physical modeling of the fluid viscosity and to the possibility of tuningappropriate regularization terms on the basis of the physical properties of the fluid. Weshow that the kinetic consistent approach offers a stable basis for a correct physicaldescription of the shear viscosity, thermal conduction and electric resistivity effects inincompressible magneto hydrodynamics flows.1 INTRODUCTIONRecently many important critical technical applications are based on the magnetohy-drodynamic principles. The magnetohydrodynamic pumping (MHP) of electrically con-127B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. Savelievductive fluid is of growing interest for many industrial applications requiring precise flowcontrol, especially in the critical conditions, enabling to break the flow or reverse flowdirection without any moving parts or mechanical devices. Today, different MHD pumpsystems are widely used in many metal melting environments such as, among others,extrusion billet casting, metal refinery for transporting molten metals, liquid metal cir-culation for alloys production. These pumps have many advantages over the mechanicalpumps including precise flow control, reduced energy consumption and less dross forma-tion.In the recent publications of the authors [1, 2], using a complex statistical distributionfunction and kinetic consistent scheme, it was investigated the effective numerical algo-rithm for the parallel high performance computing systems for the solution of the magnetogas dynamic problems. In [2] the results were presented of the mathematical modeling ofthe accretion processes of interstellar matter on the compact massive astrophysical object.We investigated the three dimensional system of differential equations including he threedimensional equation of the magnetic induction with the magnetic viscosity.The goal of the present study is the extension of the proposed kinetic consistent mag-neto gas dynamic algorithms, efficient with numerical computations on the detailed spacemesh, more than 109 cells, for the mathematical modeling of the conducting incompress-ible liquid flows.In common approaches the algorithms of mathematical modeling of incompressibleliquids are dramatically different from viscous heat conductive magneto gas dynamics al-gorithms. The present study, based on the ”equivalence” of the gases with Mach numbersless then 0.1, investigated the possibility of using the method of magneto gas dynamicswith minimal changes for the mathematical modeling of the incompressible conductiveliquid flow.2 Mathematical ModelThe sound speed in liquids is significantly higher then in gases. Taking into accountthat in technological systems the characteristic velocities is of the order of few meters persecond the conditionU ≤ 0.1M (1)is fully satisfied.The state equation (artificial) can be formulated asP = P0 + β(ρ− ρ0) (2)where the parameter β should define the condition of strong changes of the pressure withsmallest changes in density.228B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. SavelievIn this conditions the kinetic consistent system of equations is :∂ρ∂t+τ2∂2ρ∂t2+∂∂xiρui =∂∂xi(τ2∂∂xkΠik)(3)∂ρui∂+τ2∂2∂t2ρui +∂∂xkΠik =∂∂xkΠDik +∂∂xk[(τ2∂∂xkΠik)uk](4)∂E∂t+τ2∂2E∂t2+∂Fi∂xi=∂Qi∂xi+∂∂xiΠDikuk − BkΠDBik+∂∂xi[1ρ(E + p+B28pi)(τ2∂∂xkΠik)](5)∂Bi∂t+τM2∂2Bi∂t2+∂∂xkMBik =∂∂xkΠDBik (6)where the fluxes are:Πik =(p+B28pi)δik + ρuiuk − BiBk4pi(7)Fi =[(E + p+B28pi)ui − BiukBk4pi](8)MBik =ukBi − uiBk (9)ΠDik =τ2[p∂ui∂xk+ p∂uk∂xi− 23p∂um∂xmδik]+O(Ma2)(10)QDi =τ2[52p∂∂xipρ]+O(Ma2)(11)ΠDBik =τM2[1ρ(p+B28pi)(∂Bi∂xk− ∂Bk∂xi)]+O(Ma2)(12)On the left-hand side of the system of Eqs. 3-6 we retrieve the ideal magneto gas dynamicsfluxes, which are extensively expressed in the first three terms of Eq. 12. The respectivefluxes are the momentum, heat and magnetic field flux of the ideal magneto gas dynamics.On the right-hand side of the system of Eqs. 3-6 we obtain additional dissipative terms.We have shown in [2] that the leading dissipative terms correspond to the Navier-Stokesand the physical resistivity, the additional dissipative terms being a smaller order compu-tational stabiliser. The respective fluxes are extensively expressed in the last three termsof Eq. 12. They are the Navier-Stokes momentum and thermal flux and the additionalmagnetic flux due to the finite resistivity. We note here that, in comparison with thedissipative fluxes proposed in [2], the correction of O(Ma2) are neglected, as we deal withlow Mach number Ma problems in this study.329B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. Saveliev3 NUMERICAL EXAMPLES3.1 Lid driven cavityThis test is presented in [4, 5]. Here we use the same normalized units thereby definedfor a better comparison of the results. A cavity filled in with fluid is defined on thetwo-dimensional domain [0, 1]× [0, 1]. At the initial time the fluid is at rest, its density isconstant and equal to ρ0 = 1, its pressure is constant and equal to p0 = γ−1Ma−2. TheMach number Ma = 0.15 and the adiabatic constant γ = 1.4 are used. The magnetic fieldis absent. The simulation is performed with different numbers of the Reynolds numberRe = 400, 1000, 3400. The chosen set of parameters defines the fluid viscosity and thethermal conductivity:µ =Ma · cRek =µγ − 1 (13)where c is the thermal velocity of the fluid c =√γp/ρ. The value of τ in the kineticalgorithm is:τ =µp+ αhc(14)where h is the mesh size. The computational domain is divided into a mesh of 128× 128cells in order to provide a direct comparison with [4]. The boundary conditions are openfor all variables, except for the velocity, which is set to 0 on the x = 0, x = 1, z = 0borders and to 1 on the z = 1 border.Although this numerical example does not include the magnetic field, it provides a solidand well-established test for the gas dynamic components of the kinetic algorithm. Thesolution presents in fact a regular turbulent structure, with vortexes at a position and sizeconfirmed by a large number of theoretical and experimental studies. In comparison withthe traditional approaches [4], the set of kinetic consistent equations used in this studyincludes the density continuity equation and the energy dissipation. We like to show thatthe incompressibility of the fluid follows from the physical property of the fluid at a lowMach number.The simulation is run until the steady state is reached, a time at which the densityand the streamlines of the velocity field are calculated and the results are shown onFig. 1–Fig. 3.In the three cases under examination, the density keeps its initial constant value withina 5% tolerance, which defines a small level of compressibility due to the set of equationsused. The velocity streamlines are consistent with the expectations in []. The centralvortex is moving closer to the center with increasing Reynold number. At Re = 400,besides the central vortex, two additional vortexes on the lower corners appear. Theirsize increases with higher Reynold number. In addition the appearance of a vortex on thetop left corner for the higher Reynold number Re = 3200 guarantees the correctness ofthe kinetic consistent equations used in this study.430B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. SavelievFigure 1: Density (left) and streamlines of the velocity field (right) of the lid driven cavity problem withRe = 400.3.2 Lid driven cavity with liquid sodiumAs a second test we repeat the lid-driven cavity test proposed in the previous sectionusing the physical parameters and units for the description of the behavior of liquidsodium. A cavity of size 0.3 m×0.3 m is filled in with liquid sodium. At the initialtime the liquid metal is at rest, with initial density ρ0 = 874 Kg/m3 and temperatureT = 600◦ K. The magnetic field is absent.The upper lid is moving with a velocity of 2 m/s, which defines a Mach number of0.005. This is a typical value of the stream velocity of liquid metal systems.The liquid sodium viscosity and thermal conductivity are calculated with the empiricalformulation from tabulated data [6]:µ = exp(−6.4406− 0.3958 log T + 556.835T)(15)k = −124.67− 0.11381T + 5.5226× 10−5T 2 − 1.1842× 10−8T 3 (16)The value of τ in the kinetic algorithm is calculated as in Eq. 14.The computational domain is decomposed into 128×128 cells, the mesh size being thenh = 2.34375 mm. As above the boundary conditions are open for all variables, except forthe velocity, which is set to 0 on the x = 0, x = 1, z = 0 borders and to 2 m/s on thez = 1 border.Although also this test does not include the magnetic field, it is a necessary step forthe evaluation of the modeling performance. We aim at showing that, using a morerealistic set of parameters for the description of the liquid sodium, the structure of thestreamlines of the velocity field assumes specific features, which can not be easily included531B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. SavelievFigure 2: Density (left) and streamlines of the velocity field (right) of the lid driven cavity problem withRe = 1000.in the previous lid-driven cavity normalized problem. Moreover as before the set of kineticconsistent equations used in this study includes the density continuity equation and theenergy dissipation. We like to show that the non compressibility of the liquid sodiumfollows from the physical property of the fluid at a low Mach number.In Fig. 4 we show the solution at time t = 1s. Although it is far from the steadystate, the vortex structure inset is clearly visible. We plan to extend the simulation tofurther time, in order to study the vortex structure at the steady state. The density isconstant, with the exception of the points at the edges of the lid, which are well-knownas discontinuity points in this test. Thus also the compressible-fluid approximation of thesolution is preserved at initial times by the kinetic consistent set of equations used in thecalculation.3.3 Liquid sodium flow in pipe with magnetohydrodynamic pumpIn this third numerical test we include the magnetic field for the simulation of a proto-type of a liquid sodium magnetic pump pipe. This problem arises in the cooling systemsof high-density thermal power, which require fluids with high thermal conductivity, suchas liquid metals. Electromagnetic pumps are used in liquid metal flow control in coolingsystems. The operation of the electromagnetic pump used for the flow control is basedon the Faraday principle, where the electric current and the magnetic field interactiongenerates the magnetic driving force which produces the metallic fluid flow [7]. This typeof equipment can control a high conductivity liquid metal flow in a close circuit and facil-itates natural circulation in the event of failures or accidents, which is highly convenientfor the safety of nuclear reactors.In this simulation a 2-dimensional pipe with dimensions 0.3 m×0.1 m is filled with liquid632B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. SavelievFigure 3: Density (left) and streamlines of the velocity field (right) of the lid driven cavity problem withRe = 3400.sodium. At the initial time the liquid metal is at rest, with initial density ρ0 = 878 Kg/m3and temperature T = 600◦ K. In the first portion of the pipe, at x < 0.1 m, an externalcurrent is placed, with direction perpendicular to the pipe and strength I = 800 A. Inthe same portion of the pipe and initial magnetic field directed along the y-axis is placed,with strength B = 0.05 T. These magnetic field and current provide the driving force ofthe liquid meal flow.Border conditions are open for all variables at all boundaries, with the exception of thevelocity, which is set to 0 at the upper and lower boundaries. The liquid sodium viscosityand thermal conductivity are calculated with the empirical formulation from tabulateddata [6] as in Eq. 15 and Eq. 16. The resistivity is calculated also from tabulated data:µb =(−9.9141 + 8.2022× 10−2T − 1.3215× 10−4T 2 + 1.7272× 10−7T 3−9.0265× 10−11T 4 + 1.9553× 10−14T 5)× 10−8 (17)The results of the numerical modeling are shown on Fig. 5 at a time t = 10 ms.Following the magnetic force induced by the magnetic field and he current, a flow isorganized in the pipe. The profile of the velocity flow is shown on Fig. 6 and is in agreementwith a laminar flow hypothesis. The velocity flow has a maximum strength of 2.5 m/s inthe center of the pipe. The density is uniform within a tolerance of 3%, which providesalso the magnitude of the compressible liquid approximation in the kinetic consistentequations used in this study. The magnetic field lines are distorted and smoothed, as asresult of the interaction with the produced flow and of the liquid sodium resistivity.This test is the first successful step for the demonstration of the use of the kineticconsistent magneto gas dynamics equations in the modeling of the magnetic pump flowfor liquid metals.733B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. SavelievFigure 4: Density (left) and streamlines of the velocity field (right) of the lid driven cavity problem forliquid sodium at time t=1s .4 CONCLUSIONSKinetic consistent model previously is used for the mathematical modeling of the ion-ized gases, can be successfully used for the mathematical modelling of the incompressiveconducting liquid flow (magnetohydrodynamic problems). Proposed algorithm is inpor-tant for mathematical modelling of the processes in number of the inportant technologicalsystems at parallel high performance computing systems.ACNOWLEDGEMENTThis study was supported by Russian Science Foundation grant 14-11-00170REFERENCES[1] B.N. Chetverushkin, N. DAscenzo, V.I. Saveliev, Kinetically Consistent Magneto-gasdynamic Equations and Their Use in Supercomputer Computations, Dokl. Math,RAS. (2014) 90:495-498.[2] B.N. Chetverushkin, N. DAscenzo, V.I. Saveliev, Kinetically Consistent Magneto-gasdynamic Equations and Their Use in Supercomputer Computations, Dokl. Math,RAS. (2014) 90:495-498.[3] B.N. Chetverushkin, N. DAscenzo, V.I. Saveliev, Hyperbolic type explicit kineticscheme of magneto gas dynamics for high performance computing systems,Russ. J.Num. Anal. Math. Model. (2015) 30 27-36.834B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. Saveliev[4] Chia U., Chia K.N., Shin C.T. High Re Solutions for Incompressible Flow Usingthe Navier-Stokes Equations and a Multigrid Method. J. of Computational Physics(1982) 48:384–411.[5] J.L.Sohn Evaluation of Fidap on some Classical Laminar and Turbulent BenchmarksInt. J. for Num. Meth. in Fluids (1998) 8:1469–1490.[6] J.K. Fink and L. Leibowitz, Thermodynamic and transport properties of sodium liquidand vapor, ANL/RE-95/2, 1995.[7] E. M. Borges, F.A. Braz Filbo, L. N. F. Guimaraes, Liquid metal flow control by DCelectromagnetic pump, Thermal Engineering, (2010) 9 47-54.[8] U.Chia, K.N.Chia and C.T.Shin, Thermodynamic and transport properties of sodiumliquid and vapor, ANL/RE-95/2, 1995.[9] J.K. Fink and L. Leibowitz, Thermodynamic and transport properties of sodium liquidand vapor, ANL/RE-95/2, 1995.935B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. SavelievFigure 5: Density, magnetic field and velocity of the liquid sodium magnetic pump pipe problem att=10 ms.1036B. Chetverushkin, N. D’Ascenzo, A.Saveliev and V. Savelievy [m]0 0.02 0.04 0.06 0.08 0.1Velocity Magnitude [m/s]00.511.522.5Figure 6: Profile of the velocity magnitude along a line parallel to the y-axis for the liquid sodiummagnetic pump pipe problem at t=10 ms.1137

https://upcommons.upc.edu/bitstream/2117/190253/1/Coupled-2017-01-Novel%20kinetic%20consistent.pdf

Novel kinetic consistent algorithm for the modeling of incompressible conducting flows

Abstract

Similar works

Full text

Available Versions

UPCommons

UPCommons. Portal del coneixement obert de la UPC