Local integration by parts and Pohozaev identities for higher order fractional Laplacians
Abstract
We establish an integration by parts formula in bounded domains for the higher order fractional Laplacian (-)s with s>1. We also obtain the Pohozaev identity for this operator. Both identities involve local boundary terms, and they extend the identities obtained by the authors in the case s∈(0,1). As an immediate consequence of these results, we obtain a unique continuation property for the eigenfunctions (-)sφ=λφ in , φ0 in Rn.
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