On inhomogeneous heat equation with inverse square potential

Abstract

We study inhomogeneous heat equation with inverse square potential, namely, \[∂tu + La u= |·|-b |u|αu,\] where La=- + a |x|-2. We establish some fixed-time decay estimate for e-tLa associated with inhomogeneous nonlinearity |·|-b in Lebesgue spaces. We then develop local theory in Lq- scaling critical and super-critical regime and small data global well-posedness in critical Lebegue spaces. We further study asymptotic behaviour of global solutions by using self-similar solutions, provided the initial data satisfies certain bounds. Our method of proof is inspired from the work of Slimene-Tayachi-Weissler (2017) where they considered the classical case, i.e. a=0.