Decay of solutions to a porous media equation with fractional diffusion
Entity
UAM. Departamento de MatemáticasPublisher
Khayyam Publishing, Inc.Date
2013-11-12Citation
10.57262/ade/1384278134
Advances in Differential Equations 19.1-2 (2014): 133-160
ISSN
1079-9389DOI
10.57262/ade/1384278134Funded by
C.J. Niche was partially supported by PRONEX E-26/110.560/2010-APQ1, FAPERJ-CNPq. R. Orive was partially supported by MTM2011-26696 of MICINN and SEV-2011-0087. Both authors were partially supported by Project CNPq 19/2011 – Convenios Bilaterais (Brasil) and 2011BR0093 CSIC (Spain)Project
Gobierno de España. MTM2011-26696; Gobierno de España. SEV-2011-0087Editor's Version
https://doi.org/10.57262/ade/1384278134Subjects
Quasi-Geostrophic Equations; Regularity Criterion; Nonlocal; MatemáticasRights
© 2014 Khayyam Publishing, Inc.Abstract
In this article we prove results concerning the decay and first order asymptotic behaviour of solutions to a system of equations that model heat transfer in a porous medium by an incompressible flow with fractional dissipation
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Google Scholar:Niche, César J.
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Orive Illera, Rafael
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