Sobolev regularity theory for the non-local elliptic and parabolic equations on C1,1 open sets
Abstract
We study the zero exterior problem for the elliptic equation α/2u-λ u=f, x∈ D\,; u|Dc=0 as well as for the parabolic equation ut=α/2u+f, t>0,\, x∈ D \,; u(0,·)|D=u0, \,u|[0,T]× Dc=0. Here, α∈ (0,2), λ ≥ 0 and D is a C1,1 open set. We prove uniqueness and existence of solutions in weighted Sobolev spaces, and obtain global Sobolev and H\"older estimates of solutions and their arbitrary order derivatives. We measure the Sobolev and H\"older regularities of solutions and their arbitrary derivatives using a system of weights consisting of appropriate powers of the distance to the boundary. The range of admissible powers of the distance to the boundary is sharp.
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