A duality approach to the fractional Laplacian with measure data
Abstract
We describe a duality method to prove both existence and uniqueness of solutions to nonlocal problems like (-)s v = μ in\ RN, with vanishing conditions at infinity. Here μ is a bounded Radon measure whose support is compactly contained in RN, N≥2, and -()s is the fractional Laplace operator of order s∈ (1/2,1).
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