A complete characterisation of local existence for semilinear heat equations in Lebesgue spaces

Abstract

We consider the scalar semilinear heat equation ut- u=f(u), where f[0,∞)[0,∞) is continuous and non-decreasing but need not be convex. We completely characterise those functions f for which the equation has a local solution bounded in Lq() for all non-negative initial data u0∈ Lq(), when ⊂ Rd is a bounded domain with Dirichlet boundary conditions. For q∈(1,∞) this holds if and only if s∞s-(1+2q/d)f(s)<∞; and for q=1 if and only if ∫1∞ s-(1+2/d)F(s)\, ds<∞, where F(s)=1 t sf(t)/t. This shows for the first time that the model nonlinearity f(u)=u1+2q/d is truly the `boundary case' when q∈(1,∞), but that this is not true for q=1. The same characterisation results hold for the equation posed on the whole space Rd provided that in addition s0f(s)/s<∞.