Hostname: page-component-78c5997874-fbnjt Total loading time: 0 Render date: 2024-11-19T08:19:26.845Z Has data issue: false hasContentIssue false
  • English
  • Français

Analytical solution of flows in porous media for transpiration cooling applications

Published online by Cambridge University Press:  11 March 2021

Tobias Hermann Open the ORCID record for Tobias Hermann [Opens in a new window]  and
M. McGilvray Open the ORCID record for M. McGilvray [Opens in a new window]
Tobias Hermann*
Affiliation:
Oxford Thermofluids Institute, University of Oxford, OxfordOX2 0ES, UK
M. McGilvray
Affiliation:
Oxford Thermofluids Institute, University of Oxford, OxfordOX2 0ES, UK
*
Email address for correspondence: tobias.hermann@eng.ox.ac.uk
Get access Rights & Permissions [Opens in a new window]

Abstract

This paper presents closed analytical solutions for the pressure and velocity fields of flows in two-dimensional porous media. The flow field is modelled through a potential function which allows the use of the Laplace equation to describe the pressure field. The boundary conditions of the porous medium are tailored to represent general cases encountered in transpiration cooling applications. These include mixed Neumann and Dirichlet boundary conditions to represent a pressurised plenum driving a coolant mass flux, and impermeable sections where the plenum is attached to a non-porous substructure. The external pressure boundary is modelled as an arbitrary function representing a flow around the porous domain, and the wall thickness of the porous domain can take any arbitrary distribution. General solutions in Cartesian coordinates and cylindrical coordinates are provided describing the entire porous domain of a flat plate or curved geometry, respectively. In addition, special simplified solutions are provided for regions of particular interest, such as the interface of external flow and porous medium. The obtained solutions are verified through a comparison to a numerical simulation of two test cases, a rectangular flat plate geometry and 90$^\circ$ section of a cylindrical case.

JFM classification

Low-Reynolds-number flows: Porous media Mathematical Foundations: General fluid mechanics
Type
JFM Papers
Information
Journal of Fluid Mechanics , Volume 915 , 25 May 2021 , A38
Check for updates
Copyright
© The Author(s), 2021. Published by Cambridge University Press

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Anderson, J.D. 2006 Hypersonic and High-Temperature Gas Dynamics, 2nd edn. AIAA Education Series.CrossRefGoogle Scholar
Beavers, G.S. & Joseph, D.D. 1967 Boundary conditions at a naturally permeable wall. J. Fluid Mech. 30 (1), 197207.CrossRefGoogle Scholar
Boehrk, H. & Beyermann, U. 2010 Secure tightening of a CMC fastener for the heat shield of re-entry vehicles. Compos. Struct. 92 (1), 107112.CrossRefGoogle Scholar
Boehrk, H., Piol, O. & Kuhn, M. 2010 Heat balance of a transpiration-cooled heat shield. J. Thermophys. Heat Transfer 24 (3), 581588.CrossRefGoogle Scholar
Carraro, T., Goll, C., Marciniak-Czochra, A. & Mikeli, A. 2013 Pressure jump interface law for the Stokes–Darcy coupling: confirmation by direct numerical simulations. J. Fluid Mech. 732, 510536.CrossRefGoogle Scholar
Colwell, G.T. & Modlin, J.M. 1992 Heat pipe and surface mass transfer cooling of hypersonic vehicle structures. J. Thermophys. Heat Transfer 6 (3), 492499.CrossRefGoogle Scholar
Ding, J. & Wang, S. 2018 Analytical solution for 2D inter-well porous flow in a rectangular reservoir. Appl. Sci. 8 (4), 586.CrossRefGoogle Scholar
Esser, B., Gülhan, A., Reimer, T. & Petkov, I. 2015 Experimental verification of thermal management concepts for space vehicles. In 8th European Symposium on Aerothermodynamics for Space Vehicles, Conference Proceedings Online 91674, pp. 1–8.Google Scholar
van Foreest, A., Glhan, A., Esser, B., Sippel, M., Ambrosius, B. & Sudmeijer, K. 2020 Transpiration cooling using liquid water. In Fluid Dynamics and Co-located Conferences. American Institute of Aeronautics and Astronautics.Google Scholar
Hermann, T., McGilvray, M. & Naved, I. 2020 Performance of transpiration-cooled heat shields for reentry vehicles. AIAA J. 58 (2), 830841.CrossRefGoogle Scholar
Idelchik, I.E. 1986 Handbook of Hydraulic Resistance, 2nd revised and enlarged edn. Hemisphere Publishing Corp.Google Scholar
Lācis, U., Sudhakar, Y., Pasche, S. & Bagheri, S. 2020 Transfer of mass and momentum at rough and porous surfaces. J. Fluid Mech. 884, A21.CrossRefGoogle Scholar
Lees, L. 1956 Laminar heat transfer over blunt-nosed bodies at hypersonic flight speeds. J. Jet Propul. 26 (4), 259269.CrossRefGoogle Scholar
Liu, Y.-Q., Jiang, P., Jin, S.-S. & Sun, J.-G. 2010 Transpiration cooling of a nose cone by various foreign gases. Intl J. Heat Mass Transfer 53, 53645372.CrossRefGoogle Scholar
Nguyen, V.U. & Raudkivi, A.J. 1983 Analytical solution for transient two-dimensional unconfined groundwater flow. Hydrol. Sci. J. 28 (2), 209219.CrossRefGoogle Scholar
Nield, D.A. & Bejan, A. 2012 Convection in Porous Media, 4th edn. Springer.Google Scholar
Read, W.W. 2000 An iterative analytic series method for Laplacian problems with free and mixed boundary conditions. ANZIAM J. 42, C1238C1259.CrossRefGoogle Scholar
Read, W.W. 2007 An analytic series method for Laplacian problems with mixed boundary conditions. J. Comput. Appl. Math. 209 (1), 2232.CrossRefGoogle Scholar
Rife, M.E. & di Mare, L. 2019 Numerical flux function for flow through porous media with discontinuous properties. J. Comput. Phys. 397, 108833.CrossRefGoogle Scholar
Rubesin, M.W. 1954 An analytical estimation of the effect of transpiration cooling on the heat-transfer and skin-friction characteristics of a compressible, turbulent boundary layer. Tech. Rep. 3341. National Advisory Committee for Aeronautics Collection.Google Scholar
Sherwood, J.D. & Stone, H.A. 2001 Leakage through filtercake into a fluid sampling probe. Phys. Fluids 13 (5), 11511159.CrossRefGoogle Scholar
Warrick, A.W., Broadbridge, P. & Lomen, D.O. 1992 Approximations for diffusion from a disc source. Appl. Math. Model. 16 (3), 155161.CrossRefGoogle Scholar