On solvability of a time-fractional doubly critical semilinear equation, and its quantitative approach to the non-existence result on the classical counterpart

Abstract

We study a time-fractional semilinear heat equation ∂αt u - u = up,\ \ in\ (0,T)×RN,\ \ u(0)=u00 with u0∈ L1(RN) and p=1+2/N. Here ∂tα denotes the Caputo derivative of order α ∈ (0,1). Since the space L1(RN) is scale critical with p=1+2/N, this type of equation is known as a doubly critical problem. It is known that the usual doubly critical equation ∂t u- u=up does not have nonnegative global-in-time solutions, while the time-fractional problem does. Moreover, there exists a singular initial data which admits no local-in-time solution, while the time-fractional equation is solvable for any L1(RN) initial data. In this paper, we deduce a necessary condition imposed on u0 for the existence of a nonnegative solution. Furthermore, we obtain corollaries that describe the collapse of the local and global solvability for the time-fractional equation as α → 1.