论文信息 - An estimate of the localization for the evolution p-Laplacian equation

An estimate of the localization for the evolution p-Laplacian equation

Abstract Liang and Zhao showed in [Z. Liang, J. Zhao, Localization for the evolution p -Laplacian equation with strongly nonlinear source term, J. Differential Equations 246 (2009) 391–407] that the unbounded solution of the equation u t = div ( | ∇ u | p − 2 ∇ u ) + u q , ( x , t ) ∈ R N × ( 0 , T ) is strictly localized for q ≥ p − 1 , provided that the initial function is compactly supported. In this work we give an upper estimate on the localization in terms of the initial support supp u 0 ( x ) and the blowing-up time T ∞ .

Zhilei Liang | Zhilei Liang

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