Nonuniqueness for fractional parabolic equations with sublinear power-type nonlinearity

Abstract

We show that the parabolic equation ut + (-)s u = q(x) |u|α-1 u posed in a time-space cylinder (0,T) × RN and coupled with zero initial condition and zero nonlocal Dirichlet condition in (0,T) × (RN ), where is a bounded domain, has at least one nontrivial nonnegative finite energy solution provided α ∈ (0,1) and the nonnegative bounded weight function q is separated from zero on an open subset of . This fact contrasts with the (super)linear case α ≥ 1 in which the only bounded finite energy solution is identically zero.