Existence of Nonnegative Solutions of Nonlinear Fractional Parabolic Inequalities

Abstract

We study the existence of nontrivial nonlocal nonnegative solutions u(x,t) of the nonlinear initial value problems \[ (∂t -)α u≥ uλ in Rn ×R,\,n≥ 1 \] \[ u=0 Rn ×(-∞,0) \] and \[ C1 uλ ≤(∂t -)α u≤ C2 uλ Rn ×R,\,n≥1 \] \[ u=0 Rn ×(-∞,0), \] where λ,α,C1, and C2 are positive constants with C1 <C2. We use the definition of the fractional heat operator (∂t -)α given in [Taliaferro, 2020] and compare our results in the classical case α=1 to known results.