Bartłomiej Dyda, Alexey Kuznetsov, Mateusz Kwaśnicki
Published 2015-09-28Version 1
We significantly expand the number of functions whose image under the fractional Laplace operator can be computed explicitly. In particular, we show that the fractional Laplace operator maps Meijer G-functions of |x|^2, or generalized hypergeometric functions of -|x|^2, multiplied by a solid harmonic polynomial, into the same class of functions. As one important application of this result, we produce a complete system of eigenfunctions of the operator (1-|x|^2)_+^{alpha/2} (-Delta)^{alpha/2} with the Dirichlet boundary conditions outside of the unit ball. The latter result will be used to estimate the eigenvalues of the fractional Laplace operator in the unit ball in a companion paper "Eigenvalues of the fractional Laplace operator in the unit ball".
Minimizing Harmonic Maps on the Unit Ball with Tangential Anchoring
QCH mappings between unit ball and domain with $C^{1,α}$ boundary
A Trudinger-Moser inequality for conical metric in the unit ball
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