On the Nonexistence of Global Solutions for Nonlocal Parabolic Equations with Forcing Terms

Abstract

The purpose of this work is to analyze the well-posedness and blow-up behavior of solutions to the nonlocal semilinear parabolic equation with a forcing term: \[ ∂t u - u = \|u(t)\|qα |u|p + t w(x) in RN × (0, ∞), \] where N ≥ 1, p, q ≥ 1, α ≥ 0, > -1, and w(x) is a suitably given continuous function. The novelty of this work, compared to previous studies, lies in considering a nonlocal nonlinearity \|u(t)\|qα |u|p and a forcing term t w(x) that depend on both time and space variables. This combination introduces new challenges in understanding the interplay between the nonlocal structure of the equation and the spatio-temporal forcing term. Under appropriate assumptions, we establish the global existence of solutions for small initial data in Lebesgue spaces when the exponent p exceeds a critical value. In contrast, we show that the global existence cannot hold for p below this critical value, provided the additional condition ∫RN w(x) \, dx > 0 is satisfied. The main challenge in this analysis lies in managing the complex interaction between the nonlocal nonlinearity and the forcing term, which significantly influences the behavior of solutions.

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