Blow-up for time-fractional diffusion equations with superlinear convex semilinear terms

Abstract

This article is concerned with a semilinear time-fractional diffusion equation with a superlinear convex semilinear term in a bounded domain with the homogeneous Dirichlet, Neumann, Robin boundary conditions and non-negative and not identically vanishing initial value. The order of the fractional derivative in time is between 1 and 0, and the elliptic part is with time-independent coefficients. We prove (i) The solution with any initial value blow-up if the eigenvalue λ1 of the elliptic operator with the minimum real part is non-positive. (ii) Otherwise, the solution blows up if a weighted L1-norm of initial value is greater than some critical value give by λ1. We provide upper estimates of the blow-up times. The key is a comparison principle for time-fractional ordinary differential equations.

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