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Corner and finger formation in Hele-Shaw flow with kinetic undercooling regularisation

Published online by Cambridge University Press:  04 August 2014

MICHAEL C. DALLASTON
Affiliation:
Mathematical Institute, University of Oxford, Oxford OX2 6GG, UNITED KINGDOM
SCOTT W. McCUE
Affiliation:
Mathematical Sciences, Queensland University of Technology, Brisbane 4000, AUSTRALIA email: [email protected]

Abstract

We examine the effect of a kinetic undercooling condition on the evolution of a free boundary in Hele-Shaw flow, in both bubble and channel geometries. We present analytical and numerical evidence that the bubble boundary is unstable and may develop one or more corners in finite time, for both expansion and contraction cases. This loss of regularity is interesting because it occurs regardless of whether the less viscous fluid is displacing the more viscous fluid, or vice versa. We show that small contracting bubbles are described to leading order by a well-studied geometric flow rule. Exact solutions to this asymptotic problem continue past the corner formation until the bubble contracts to a point as a slit in the limit. Lastly, we consider the evolving boundary with kinetic undercooling in a Saffman-Taylor channel geometry. The boundary may either form corners in finite time, or evolve to a single long finger travelling at constant speed, depending on the strength of kinetic undercooling. We demonstrate these two different behaviours numerically. For the travelling finger, we present results of a numerical solution method similar to that used to demonstrate the selection of discrete fingers by surface tension. With kinetic undercooling, a continuum of corner-free travelling fingers exists for any finger width above a critical value, which goes to zero as the kinetic undercooling vanishes. We have not been able to compute the discrete family of analytic solutions, predicted by previous asymptotic analysis, because the numerical scheme cannot distinguish between solutions characterised by analytic fingers and those which are corner-free but non-analytic.

Type
Papers
Copyright
Copyright © Cambridge University Press 2014 

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References

Angenent, S. B. & Aronson, D. G. (1995) The focusing problem for the radially symmetric porous medium equation. Comm. Part. Diff. Eq. 20, 12171240.CrossRefGoogle Scholar
Angenent, S. B. & Aronson, D. G. (2004) The focusing problem for the eikonal equation. In: Nonlinear Evolution Equations and Related Topics, Springer, pp. 137151.Google Scholar
Back, J. M., McCue, S. W., Hsieh, M. H.-N. & Moroney, T. J. (2014) The effect of surface tension and kinetic undercooling on a radially-symmetric melting problem. Appl. Math. Comp. 229, 4152.CrossRefGoogle Scholar
Bensimon, D. (1986) Stability of viscous fingering. Phys. Rev. A 33, 13021308.Google Scholar
Ceniceros, H. D. & Hou, T. Y. (1998) Convergence of a non-stiff boundary integral method for interfacial flows with surface tension. Math. Comp. 67, 137182.Google Scholar
Chapman, S. J. (1999) On the rôle of Stokes lines in the selection of Saffman–Taylor fingers with small surface tension. Eur. J. Appl. Math. 10, 513534.Google Scholar
Chapman, S. J. & King, J. R. (2003) The selection of Saffman–Taylor fingers by kinetic undercooling. J. Eng. Math. 46, 132.Google Scholar
Cohen, D. S. & Erneux, T. (1988) Free boundary problems in controlled release pharmaceuticals. I: Diffusion in glassy polymers. SIAM J. Appl. Math. 48, 14511465.CrossRefGoogle Scholar
Crowdy, D. G. (2002) A theory of exact solutions for the evolution of a fluid annulus in a rotating Hele–Shaw cell. Quart. Appl. Math. 60, 1136.CrossRefGoogle Scholar
Dallaston, M. C. (2013) Mathematical Models of Bubble Evolution in a Hele–Shaw Cell. PhD thesis, Queensland University of Technology.Google Scholar
Dallaston, M. C. & McCue, S. W. (2011) Numerical solution to the Saffman–Taylor finger problem with kinetic undercooling regularisation. In: Proceedings of the 15th Biennial Computational Techniques and Applications Conference, CTAC–2010, volume 52 of ANZIAM J., pp. C124–C138.Google Scholar
Dallaston, M. C. & McCue, S. W. (2012) New exact solutions for Hele–Shaw flow in doubly connected regions. Phys. Fluids 24, 052101.Google Scholar
Dallaston, M. C. & McCue, S. W. (2013) An accurate numerical scheme for the contraction of a bubble in a Hele–Shaw cell. In: Proceedings of the 16th Biennial Computational Techniques and Applications Conference, CTAC–2012, volume 54 of ANZIAM J., pp. C309–C326.CrossRefGoogle Scholar
Dallaston, M. C. & McCue, S. W. (2013) Bubble extinction in Hele–Shaw flow with surface tension and kinetic undercooling regularisation. Nonlinearity 26, 16391665.Google Scholar
Degregoria, A. J. & Schwartz, L. W. (1986) A boundary-integral method for 2-phase displacement in Hele–Shaw cells. J. Fluid Mech. 164, 383400.Google Scholar
Dias, E. O., Alvarez-Lacalle, E., Carvalho, M. S. & Miranda, J. S. (2012) Minimization of viscous fluid fingering: A variational scheme for optimal flow rates. Phys. Rev. Lett. 109, 144502.CrossRefGoogle ScholarPubMed
Dias, E. O. & Miranda, J. A. (2010) Control of radial fingering patterns: A weakly nonlinear approach. Phys. Rev. E 81, 016312 (1–7).Google Scholar
Ebert, U., Brau, F., Derks, G., Hundsdorfer, W., Kao, C-Y., Li, C., Luque, A., Meulenbroek, B., Nijdam, S., Ratushnaya, V., Schäfer, L. & Tanveer, S. (2011) Multiple scales in streamer discharges, with an emphasis on moving boundary approximations. Nonlinearity 24, C1C26.Google Scholar
Ebert, U., Meulenbroek, B. J. & Schäfer, L. (2007) Convective stabilization of a Laplacian moving boundary problem with kinetic undercooling. SIAM J. Appl. Math. 68, 292310.CrossRefGoogle Scholar
Entov, V. M. & Etingof, P. I. (1991) Bubble contraction in Hele–Shaw cells. Q. J. Mech. Appl. Math. 44, 507535.Google Scholar
Entov, V. M. & Etingof, P. I. (2011) On the breakup of air bubbles in a Hele–Shaw cell. Eur. J. Appl. Math. 22, 125149.Google Scholar
Evans, J. D. & King, J. R. (2000) Asymptotic results for the Stefan problem with kinetic undercooling. Q. J. Mech. Appl. Math. 53, 449473.Google Scholar
Fasano, A., Meyer, G. H. & Primicerio, M. (1986) On a problem in the polymer industry: theoretical and numerical investigation of swelling. SIAM J. Math. Anal. 17, 945960.Google Scholar
Fox, L. & Parker, I. B. (1968) Chebyshev Polynomials in Numerical Analysis, Vol. 29, Oxford University Press, London.Google Scholar
Gage, M. & Hamilton, R.The shrinking of convex plane curves by heat equation. J. Diff. Geom. 23, 6996, 1986.Google Scholar
Galin, L. A. (1945) Unsteady filtration with a free surface. Dokl. Akad. Nauk. S. S. S. R. 47, 246249.Google Scholar
Grayson, M. (1987) The heat equation shrinks embedded curves to points. J. Diff. Geom. 26, 285314.Google Scholar
Günther, M. & Prokert, G. (2009) On travelling-wave solutions for a moving boundary problem of Hele–Shaw type. IMA J. Appl. Math. 74, 107127.Google Scholar
Hou, T. Y., Li, Z. L., Osher, S. & Zhao, H. K. (1997) A hybrid method for moving interface problems with application to the Hele–Shaw flow. J. Comp. Phys. 134, 236252.Google Scholar
Hou, T. Y., Lowengrub, J. S. & Shelley, M. J. (1994) Removing the stiffness from interfacial flow with surface tension. J. Comp. Phys. 114, 312338.Google Scholar
Howison, S. D. (1986) Bubble growth in porous media and Hele–Shaw cells. Proc. Roy. Soc. Edin. A 102, 141148.Google Scholar
Howison, S. D. (1986) Cusp development in Hele–Shaw flow with a free surface. SIAM J. Appl. Math. 46, 2026.Google Scholar
Howison, S. D. (1986) Fingering in Hele–Shaw cells. J. Fluid Mech. 167, 439453.Google Scholar
Howison, S. D. (1992) Complex variable methods in Hele–Shaw moving boundary problems. Eur. J. Appl. Math. 3, 209224.Google Scholar
Howison, S. D. (August 1998) Bibliography of free and moving boundary problems in Hele–shaw and Stokes flow.Google Scholar
Kao, C.-Y., Brau, F., Ebert, U., Schäfer, L. & Tanveer, S. (2010) A moving boundary model motivated by electric breakdown: II. initial value problem. Physica D 239, 15421559.Google Scholar
Kessler, D. A., Koplik, J. & Levine, H. (1988) Pattern selection in fingered growth phenomena. Adv. Phys. 37, 255339.Google Scholar
King, J. R. & Evans, J. D. (2005) Regularization by kinetic undercooling of blow-up in the ill-posed Stefan problem. SIAM J. Appl. Math. 65, 16771707.Google Scholar
King, J. R., Lacey, A. A. & Vazquez, J. L. (1995) Persistence of corners in free boundaries in Hele–Shaw. Eur. J. Appl. Math. 6, 455490.Google Scholar
King, J. R. & McCue, S. W. (2009) Quadrature domains and p-Laplacian growth. Compl. Anal. Oper. Th. 3, 453469.Google Scholar
Lee, S-Y., Bettelheim, E. & Weigmann, P. (2006) Bubble break-off in Hele–Shaw flows–-singularities and integrable structures. Physica D 219, 2234.CrossRefGoogle Scholar
Luque, A., Brau, F. & Ebert, U. (2008) Saffman–Taylor streamers: Mutual finger interaction in spark formation. Phys. Rev. E 78, 016206.Google Scholar
Martyushev, L. M. & Birzina, A. I. (2008) Specific features of the loss of stability during radial displacement of fluid in the Hele–Shaw cell. J. Phys.: Condens. Matter 20, 045201.Google Scholar
McCue, S. W., Hsieh, M., Moroney, T. J. & Nelson, M. I. (2011) Asymptotic and numerical results for a model of solvent-dependent drug diffusion through polymeric spheres. SIAM J. Appl. Math. 71, 22872311.Google Scholar
McCue, S. W. & King, J. R. (2011) Contracting bubbles in Hele–Shaw cells with a power-law fluid. Nonlinearity 24, 613641.CrossRefGoogle Scholar
McCue, S. W., King, J. R. & Riley, D. S. (2003) Extinction behaviour of contracting bubbles in porous media. Q. J. Mech. Appl. Math. 56, 455482.Google Scholar
McLean, J. W. & Saffman, P. G. (1981) The effect of surface tension on the shape of fingers in a Hele–Shaw cell. J. Fluid Mech. 102, 455469.Google Scholar
Meulenbroeck, B., Ebert, U. & Schäfer, L. (2005) Regularization of moving boundaries in a Laplacian field by a mixed Dirichlet–Neumann boundary condition: Exact results. Phys. Rev. Lett. 95, 195004.CrossRefGoogle Scholar
Mitchell, S. L. & O'Brien, S. B. G. (2012) Asymptotic, numerical and approximate techiques for a free boundary problem arising in the diffusion of glassy polymers. Appl. Math. Comp. 219, 376388.Google Scholar
Paterson, L. (1981) Radial fingering in a Hele–Shaw cell. J. Fluid Mech. 113, 513529.Google Scholar
Pleshchinskii, N. B. & Reissig, M. (2002) Hele–Shaw flows with nonlinear kinetic undercooling regularization. Nonlinear Anal. 50, 191203.CrossRefGoogle Scholar
Polubarinova-Kochina, P. Ya. (1945) On the motion of the oil contour. Dokl. Akad. Nauk. S. S. S. R. 47, 254257.Google Scholar
Reissig, M., Rogosin, D. V. & Hübner, F. (1999) Analytical and numerical treatment of a complex model for Hele–Shaw moving boundary value problems with kinetic undercooling regularization. Eur. J. Appl. Math. 10, 561579.Google Scholar
Rocha, F. M. & Miranda, J. A. (2013) Manipulation of the Saffman–Taylor instability: A curvature-dependent surface tension approach. Phys. Rev. E 87, 013017.Google Scholar
Romero, L. A. (1981) The Fingering Problem in a Hele–Shaw Cell. PhD thesis, California Institute of Technology.Google Scholar
Sethian, J. A. (1999) Level Set Methods and Fast Marching Methods, Cambridge University Press.Google Scholar
Tanveer, S. (1987) New solutions for steady bubbles in a Hele–Shaw cell. Phys. Fluids 30, 651658.Google Scholar
Tanveer, S., Schäfer, L., Brau, F. & Ebert, U. (2009) A moving boundary problem motivated by electric breakdown, I: Spectrum of linear perturbations. Physica D 238, 888901.Google Scholar
Tanveer, S. & Xie, X. (2003) Analyticity and nonexistence of classical steady Hele–Shaw fingers. Comm. Pure Appl. Math. 56, 353402.Google Scholar
Tryggvason, G. & Aref, H. (1983) Numerical experiments on Hele–Shaw flow with a sharp interface. J. Fluid Mech. 136, 130.Google Scholar
Vanden-Broeck, J-M. (1983) Fingers in a Hele–Shaw cell with surface tension. Phys. Fluids 26, 20332034.Google Scholar
Xie, X. & Tanveer, S. (2003) Rigorous results in steady finger selection in viscous fingering. Arch. Rational Mech. Anal. 166, 219286.Google Scholar