A note on the Lp-solvability of a strongly-coupled nonlocal system of equations

Abstract

The goal of this paper is to study the Lp-solvability of the strongly-coupled nonlocal system \[ L u (x) + λu(x)= f(x) in Rd \] where L is a linear nonlocal coupled vector-valued operator associated with a kernel K comparable to |y|-(d+2s) for s ∈ (0,1), satisfying certain ellipticity and cancellation conditions. For any f ∈ [Lp(Rd)]d, 1< p < ∞, the existence of a unique strong solution u ∈ [H2s,p(Rd)]d is proved via the method of continuity. To apply this method, we establish the continuity of the operator L and the necessary a priori estimates. These are obtained through the study of the corresponding parabolic system. The proof strategy follows and extends recent ideas developed for the scalar setting, combining commutator estimates, Sobolev embeddings, a level set estimates and a bootstrap argument.

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