An Lq(Lp)-regularity theory for parabolic equations with integro-differential operators having low intensity kernels

Abstract

In this article, we present the existence, uniqueness, and regularity of solutions to parabolic equations with non-local operators ∂tu(t,x) = Lau(t,x) + f(t,x), t>0 in Lq(Lp) spaces. Our spatial operator La is an integro-differential operator of the form ∫Rd ( u(x+y)-u(x) -∇ u(x) · y 1|y|≤ 1 ) a(t,y) jd(|y|)dy. Here, a(t,y) is a merely bounded measurable coefficient, and we employed the theory of additive process to handle it. We investigate conditions on jd(r) which yield Lq(Lp)-regularity of solutions. Our assumptions on jd are general so that jd(r) may be comparable to r-d(r-1) for a function which is slowly varying at infinity. For example, we can take (r)=(1+rα) or (r) = \rα,1\ (α∈(0,2)). Indeed, our result covers the operators whose Fourier multiplier () does not have any scaling condition for ||≥ 1. Furthermore, we give some examples of operators, which cannot be covered by previous results where smoothness or scaling conditions on are considered.

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