Pointwise Bounds and Blow-up for Nonlinear Fractional Parabolic Inequalities

Abstract

We investigate pointwise upper bounds for nonnegative solutions u(x,t) of the nonlinear initial value problem equation0.1 0≤(∂t-)α u≤ uλ in Rn ×R,\,n≥1, equation equation0.2 u=0 Rn×(-∞,0) equation where λ and α are positive constants. To do this we first give a definition---tailored for our study of this problem---of fractional powers of the heat operator (∂t-)α :Y X where X and Y are linear spaces whose elements are real valued functions on Rn ×R and 0<α<α0 for some α0 which depends on n, X and Y. We then obtain, when they exist, optimal pointwise upper bounds on Rn ×(0,∞) for nonnegative solutions u∈ Y of this initial value problem with particular emphasis on those bounds as t0+ and as t∞.