Nonexistence of global solutions to the Grushin heat equation with nonlocal and local nonlinearities

Abstract

In this paper, we investigate the nonexistence of global solutions to the Grushin-type heat equation with nonlinear reaction terms, including cases involving memory effects: \arrayll ut-G u = k1 ∫0t(t-s)-γup1-1u(s)\,ds + k2|u|p2-1u, & (z,t)∈ RN+k× (0,∞), u(z,0)= u0(z),&z∈ RN+k, array . where G denotes the Grushin operator, u0 ∈ L1loc(RN+k), γ∈[0,1), k1,k2 ≥ 0, and p1,p2>1. We establish sharp nonexistence results for global-in-time positive solutions, thereby completing the picture of global existence versus blow-up and allow us to identify the corresponding Fujita-type critical exponents in certain parameter regimes. The analysis relies on the test function method, adapted to handle both the degeneracy of the Grushin operator and the influence of the memory term.

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