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Sibirskii Matematicheskii Zhurnal, 2008, Volume 49, Number 2, Pages 449–463
(Mi smj1852)
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This article is cited in 1 scientific paper (total in 1 paper)
Entropy solutions to the Verigin ultraparabolic problem
S. A. Sazhenkov M. A. Lavrent'ev Institute of Hydrodynamics
Abstract:
We study the Cauchy problem for the two-dimensional ultraparabolic model of filtration of a viscous incompressible fluid containing an admixture, with diffusion of the admixture in a porous medium taken into account. The porous medium consists of the fibers directed along some vector field $n^\perp$. We prove that if the nonlinearity in the equations of the model and the geometric structure of fibers satisfy some additional “genuine nonlinearity” condition then the Cauchy problem with bounded initial data has at least one entropy solution and the fast oscillating regimes possible in the initial data are promptly suppressed in the entropy solutions. The proofs base on the introduction and systematic study of the kinetic equation associated with the problem as well as on application of the modification of Tartar $H$-measures which was proposed by Panov.
Keywords:
ultraparabolic equation, entropy solution, genuine nonlinearity, anisotropic porous medium, nonlinear convection-diffusion, kinetic equation.
Received: 02.10.2006 Revised: 25.04.2007
Citation:
S. A. Sazhenkov, “Entropy solutions to the Verigin ultraparabolic problem”, Sibirsk. Mat. Zh., 49:2 (2008), 449–463; Siberian Math. J., 49:2 (2008), 362–374
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https://www.mathnet.ru/eng/smj1852 https://www.mathnet.ru/eng/smj/v49/i2/p449
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Abstract page: | 304 | Full-text PDF : | 123 | References: | 60 |
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