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March/April 2010 Critical Fujita exponents for a coupled non-Newtonian filtration system
Sining Zheng and Miaoqing Tian Sining Zheng and Miaoqing Tian
Adv. Differential Equations 15(3/4): 381-400 (March/April 2010).

Abstract

In 1966, Fujita started the close investigation of the blow-up phenomena arising in some semilinear parabolic problems and found the so-called Fujita exponent. Later, Galaktionov and Levine researched nonlinear parabolic equations involving $p$-Laplace operators with nonlinear boundary conditions. In the present paper we extend their results to a non-Newtonian filtration system coupled via nonlinear boundary conditions. In terms of a characteristic algebraic system introduced for the problem, we obtain a clear and simpler presentation of both the critical Fujita exponent and the blow-up rate for this complicated coupled system containing six nonlinear exponent parameters. The proof for establishing the critical exponents is based on careful constructions of the comparison functions, especially for the blow-up case, by using the Barlenbratt-type solutions. The analysis of the blow-up rate relies on the appropriate scale transformation of the independent and the dependent variables with some differential inequalities satisfied by the $L^\infty$-norm of blowing up solutions. This paper provides a complete result for such a coupled degenerate parabolic system.

Citation

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Sining Zheng and Miaoqing Tian Sining Zheng and Miaoqing Tian. "Critical Fujita exponents for a coupled non-Newtonian filtration system." Adv. Differential Equations 15 (3/4) 381 - 400, March/April 2010.

Information

Published: March/April 2010
First available in Project Euclid: 18 December 2012

zbMATH: 1196.35044
MathSciNet: MR2588774

Subjects:
Primary: 35B33, 35B40, 35K65

Rights: Copyright © 2010 Khayyam Publishing, Inc.

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Vol.15 • No. 3/4 • March/April 2010
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