Pointwise Bounds and Blow-up for Systems of Semilinear Parabolic Inequalities and Nonlinear Heat Potential Estimates

Abstract

We study the behavior for t small and positive of C2,1 nonnegative solutions u(x,t) and v(x,t) of the system \[0≤ ut- u≤ vλ\] \[0≤ vt- v≤ uσ\] in × (0,1), where λ and σ are nonnegative constants and is an open subset of Rn, n 1. We provide optimal conditions on λ and σ such that solutions of this system satisfy pointwise bounds in compact subsets of as t 0+. Our approach relies on new pointwise bounds for nonlinear heat potentials which are the parabolic analog of similar bounds for nonlinear Riesz potentials.