Hopf's lemma for parabolic equations involving a generalized tempered fractional p-Laplacian
Abstract
In this paper, we study a nonlinear system involving a generalized tempered fractional p-Laplacian in B1(0): equation* \ arrayll ∂tu(x,t)+(--λf)psu(x,t)=g(t,u(x,t)), &(x,t)∈ B1(0)×[0,+∞),\\ u(x)=0,&(x,t)∈ B1c(0)×[0,+∞), array . equation* where 0<s<1, p>2,\ n≥2. We establish Hopf's lemma for parabolic equations involving a generalized tempered fractional p-Laplacian. Hopf's lemma will become powerful tools in obtaining qualitative properties of solutions for nonlocal parabolic equations..
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