On the generalized parabolic Hardy-H\'enon equation: Existence, blow-up, self-similarity and large-time asymptotic behaviour

Abstract

This paper deals with the Cauchy problem for the Hardy-H\'enon equation (and its fractional analogue). Local well-posedness for initial data in the class of continuous functions with slow decay at infinity is investigated. Small data (in critical weak-Lebesgue space) global well-posedness is obtained in Cb([0,∞);Lqc,∞(n)). As a direct consequence, global existence for data in strong critical Lebesgue Lqc(n) follows under a smallness condition while uniqueness is unconditional. Besides, we prove the existence of self-similar solutions and examine the long time behavior of globally defined solutions. The zero solution u 0 is shown to be asymptotically stable in Lqc(n) -- it is the only self-similar solution which is initially small in Lqc(n). Moreover, blow-up results are obtained under mild assumptions on the initial data and the corresponding Fujita critical exponent is found.

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