Pointwise Bounds and Blow-up for Systems of Nonlinear Fractional Parabolic Inequalities

Abstract

We investigate nonnegative solutions u(x,t) and v(x,t) of the nonlinear system of inequalities \[0≤(∂t -)α u≤ vλ\] \[ 0≤ (∂t -)β v≤ uσ\] in Rn ×R, n≥ 1, satisfying the initial conditions \[ u=v=0 in Rn ×(-∞,0) \] where λ,σ,α, and β are positive constants. Specifically, using the definition of the fractional heat operator (∂t-)α given in T, we obtain, when they exist, optimal pointwise upper bounds on Rn ×(0,∞) for nonnegative solutions u and v of this initial value problem with particular emphasis on these bounds as t0+ and as t∞.