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A complete upper estimate on the localization for the degenerate parabolic equation with nonlinear source

Pan ZhengCollege of Mathematics and Statistics Chongqing, University Chongqing 401331 P.R. ChinaChunlai MuCollege of Mathematics and Statistics Chongqing, University Chongqing 401331 P.R. China
2014en
ABI

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Abstract This paper deals with the Cauchy problem for the degenerate parabolic equation with a strongly nonlinear source urn:x-wiley:1704214:media:mma3094:mma3094-math-0001 where N ≥ 1, p > 2, q ≥ p − 1, and the blow‐up time T < ∞ . It has been shown that the solution u ( x , t ) is strictly localized for q ≥ p − 1, provided that the initial function u 0 ( x ) has a compact support by Liang and Zhao. In addition, if q > 2 p − 1, an upper estimate on the localization in terms of the initial support and the blow‐up time T is partially derived by Liang. In this work, by using the De Giorgi‐type iteration technique, we give a complete estimate on the localization for all q ≥ p − 1. Copyright © 2014 John Wiley & Sons, Ltd.

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