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A perturbation-based solution of Burnett equations for gaseous flow in a long microchannel

Published online by Cambridge University Press:  16 April 2018

Aishwarya Rath ,
Narendra Singh  and
Amit Agrawal Open the ORCID record for Amit Agrawal [Opens in a new window]
Aishwarya Rath
Affiliation:
Department of Mechanical Engineering, Indian Institute of Technology Bombay, Mumbai, 400076, India
Narendra Singh
Affiliation:
Department of Aerospace Engineering and Mechanics, University of Minnesota, Minneapolis, MN 55455, USA
Amit Agrawal*
Affiliation:
Department of Mechanical Engineering, Indian Institute of Technology Bombay, Mumbai, 400076, India
*
Email address for correspondence: [email protected]
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Abstract

In this paper, an analytical investigation of two-dimensional conventional Burnett equations has been undertaken for gaseous flow through a long microchannel. The analytical solution is obtained by using perturbation analysis around the classical Navier–Stokes solution with appropriate boundary conditions. The perturbation expansion is employed with the smallness parameter $\unicode[STIX]{x1D716}$, taken as the ratio of height to length of the microchannel. The solution for pressure is obtained by solving the cross-stream momentum equation while the velocity distribution is obtained from the streamwise momentum equation. The resulting ordinary differential equations in pressure and velocity are third-order and second-order, respectively. The required boundary conditions for pressure are obtained from direct simulation Monte Carlo (DSMC) data. The obtained analytical solution matches the available DSMC solution well. This is perhaps the first analytical solution of the Burnett equations using the perturbation approach.

JFM classification

Micro-/Nano-fluid dynamics: Micro-/Nano-fluid dynamics Micro-/Nano-fluid dynamics: Non-continuum effects Rarefied Gas Flow: Rarefied Gas Flow
Type
JFM Papers
Information
Journal of Fluid Mechanics , Volume 844 , 10 June 2018 , pp. 1038 - 1051
Copyright
© 2018 Cambridge University Press 

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References

Agarwal, R. K., Yun, K.-Y. & Balakrishnan, R. 2001 Beyond Navier–Stokes: Burnett equations for flows in the continuum–transition regime. Phys. Fluids 13 (10), 30613085.10.1063/1.1397256Google Scholar
Aoki, K., Takata, S. & Nakanishi, T. 2002 Poiseuille-type flow of a rarefied gas between two parallel plates driven by a uniform external force. Phys. Rev. E 65 (2), 026315.Google Scholar
Arkilic, E. B., Schmidt, M. A. & Breuer, K. S. 1997 Gaseous slip flow in long microchannels. J. Microelectromech. Syst. 6 (2), 167178.10.1109/84.585795Google Scholar
Bao, F.-B. & Lin, J.-Z. 2008 Burnett simulations of gas flow in microchannels. Fluid Dyn. Res. 40 (9), 679694.10.1016/j.fluiddyn.2008.03.003Google Scholar
Bird, G. A. 1994 Molecular Gas Dynamics and the Direct Simulation Monte Carlo of Gas Flows. Clarendon.Google Scholar
Bobylev, A. V. 1982 The Chapman–Enskog and Grad methods for solving the Boltzmann equation. Sov. Phys. Dokl. 27, 2931.Google Scholar
Burnett, D. 1935 The distribution of velocities in a slightly non-uniform gas. Proc. Lond. Math. Soc. 2 (1), 385430.10.1112/plms/s2-39.1.385Google Scholar
Cercignani, C. & Daneri, A. 1963 Flow of a rarefied gas between two parallel plates. J. Appl. Phys. 34 (12), 35093513.10.1063/1.1729249Google Scholar
Chapman, S. & Cowling, T. G. 1970 The Mathematical Theory of Non-uniform Gases: An Account of the Kinetic Theory of Viscosity, Thermal Conduction and Diffusion in Gases. Cambridge University Press.Google Scholar
Cheng, C. & Liao, F. 2000 DSMC analysis of rarefied gas flow over a rectangular cylinder at all Knudsen numbers. Trans. ASME J. Fluids Engng 122 (4), 720729.10.1115/1.1315301Google Scholar
Dongari, N., Agrawal, A. & Agrawal, A. 2007 Analytical solution of gaseous slip flow in long microchannels. Intl J. Heat Mass Transfer 50 (17), 34113421.10.1016/j.ijheatmasstransfer.2007.01.048Google Scholar
Fiscko, K. A. & Chapman, D. R. 1989 Comparison of Burnett, super-Burnett and Monte Carlo solutions for hypersonic shock structure. In Rarefied Gas Dynamics: Theoretical and Computational Techniques (ed. Muntz, E. P. et al. ), pp. 374395. American Institute of Aeronautics and Astronautics.Google Scholar
García-Colín, L. S., Velasco, R. M. & Uribe, F. J. 2008 Beyond the Navier–Stokes equations: Burnett hydrodynamics. Phys. Rep. 465 (4), 149189.10.1016/j.physrep.2008.04.010Google Scholar
Ho, C.-M. & Tai, Y.-C. 1998 Micro-electro-mechanical-systems (MEMS) and fluid flows. Annu. Rev. Fluid Mech. 30 (1), 579612.10.1146/annurev.fluid.30.1.579Google Scholar
Huang, C.-Y. & Li, J.-S. 2017 Rarefaction effect on gas flow in microchannels with various aspect ratios. J. Mech. 33 (1), N1N6.10.1017/jmech.2016.62Google Scholar
Karniadakis, G., Beskok, A. & Gad-el-Hak, M. 2002 Micro flows: fundamentals and simulation. Appl. Mech. Rev. 55, B76.10.1115/1.1483361Google Scholar
Maxwell, J. C. 1878 On stresses in rarefied gases arising from inequalities of temperature. Proc. R. Soc. Lond. A 27, 304308.Google Scholar
Piekos, E. S. & Breuer, K. S. 1996 Numerical modeling of micromechanical devices using the direct simulation Monte Carlo method. Trans. ASME J. Fluids Engng 118 (3), 464469.10.1115/1.2817781Google Scholar
Pong, K.-C., Ho, C.-M., Liu, J. & Tai, Y.-C. 1994 Non-linear pressure distribution in uniform microchannels. In Application of Microfabrication to Fluid Mechanics, vol. FED‐197, pp. 5156. ASME.Google Scholar
Singh, N. & Agrawal, A. 2014 The Burnett equations in cylindrical coordinates and their solution for flow in a microtube. J. Fluid Mech. 751, 121141.10.1017/jfm.2014.290Google Scholar
Singh, N., Dongari, N. & Agrawal, A. 2014a Analytical solution of plane Poiseuille flow within Burnett hydrodynamics. Microfluid Nanofluid 16 (1–2), 403412.10.1007/s10404-013-1224-7Google Scholar
Singh, N., Gavasane, A. & Agrawal, A. 2014b Analytical solution of plane Couette flow in the transition regime and comparison with direct simulation Monte Carlo data. Comput. Fluids 97, 177187.10.1016/j.compfluid.2014.03.032Google Scholar
Singh, N., Jadhav, R. S. & Agrawal, A. 2017 Derivation of stable Burnett equations for rarefied gas flows. Phys. Rev. E 96 (1), 013106.Google Scholar
Singh, N. & Schwartzentruber, T. E. 2016 Heat flux correlation for high-speed flow in the transitional regime. J. Fluid Mech. 792, 981996.10.1017/jfm.2016.118Google Scholar
Truesdell, C. & Muncaster, R. G. 1980 Fundamentals of Maxwell’s Kinetic Theory of a Simple Monatomic Gas: Treated as a Branch of Rational Mechanics. Academic Press.Google Scholar
Xu, K. 2003 Super-Burnett solutions for Poiseuille flow. Phys. Fluids 15 (7), 20772080.10.1063/1.1577564Google Scholar
Xu, K. & Li, Z. 2004 Microchannel flow in the slip regime: gas-kinetic BGK–Burnett solutions. J. Fluid Mech. 513, 87110.10.1017/S0022112004009826Google Scholar
Zhao, W., Chen, W. & Agarwal, R. K. 2014 Formulation of a new set of simplified conventional Burnett equations for computation of rarefied hypersonic flows. Aerosp. Sci. Technol. 38, 6475.10.1016/j.ast.2014.07.014Google Scholar
Zheng, Y., Garcia, A. L. & Alder, B. J. 2002 Comparison of kinetic theory and hydrodynamics for Poiseuille flow. J. Stat. Phys. 109 (3–4), 495505.10.1023/A:1020498111819Google Scholar
Zhong, X., MacCormack, R. W. & Chapman, D. R. 1993 Stabilization of the Burnett equations and application to hypersonic flows. AIAA J. 31 (6), 10361043.10.2514/3.11726Google Scholar
Zohar, Y., Lee, S. Y. K., Lee, W. Y., Jiang, L. & Tong, P. 2002 Subsonic gas flow in a straight and uniform microchannel. J. Fluid Mech. 472, 125151.10.1017/S0022112002002203Google Scholar