Double Criticality for a Hardy-Rellich Biharmonic Heat Equation in an Exterior Domain

Abstract

We study the existence and nonexistence of weak solutions to an inhomogeneous semilinear biharmonic heat equation in an exterior domain, involving a singular Hardy--Rellich potential, a weighted nonlinearity |x|σ|u|p, and a positive source term f(x). We identify two distinct critical regimes governing the behavior of solutions. More precisely, we first determine a Fujita-type critical exponent that separates nonexistence from existence. We then show that, in the supercritical range, a second critical exponent arises in terms of the decay exponent of the source, in the sense of Lee and Ni. Our results extend the recent work Tobakhanov by considering a singular Hardy--Rellich potential and a weighted nonlinearity, leading to a different critical behavior.