Fujita-type results for parabolic equations with Hartree-type nonlinearities

Abstract

This paper investigates the critical behavior of global solutions to a parabolic equation with a Hartree-type nonlinearity of the form \arrayll ut+(-)β2 u= (K |u|p)|u|q,& x∈ Rn,\,\,\,t>0, u(x,0)=u0(x),& x∈ Rn,array . where β∈(0,2], n≥1, p>1, q≥ 1, (-)β2,\,β∈(0,2) denotes the fractional Laplacian, the symbol denotes the convolution operation in Rn, and K:(0,∞)→(0,∞) is a continuous function such that K(|·p|)∈ L1loc(Rn) and is monotonically decreasing in a neighborhood of infinity. We establish conditions for the global nonexistence of solutions to the problem under consideration, thereby partially improving some results of Filippucci and Ghergu in [Discrete Contin. Dyn. Syst. A, 42 (2022) 1817-1833] and [Nonlinear Anal., 221 (2022) 112881]. In addition, we establish local and global existence results in the case where the convolution term corresponds to the Riesz potential. Our methodology relies on the nonlinear capacity method and the fixed-point principle, combined with the Hardy-Littlewood-Sobolev inequality.

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