Lifting of fractional Sobolev mappings to noncompact covering space
Abstract
Given compact Riemannian manifolds M and N, a Riemannian covering π : N N by a noncompact covering space N, 1 < p < ∞ and 0 < s < 1, the space of liftings of fractional Sobolev maps in Ws, p (M, N) is characterized when sp > 1 and an optimal nonlinear fractional Sobolev estimate is obtained when moreover sp M. A nonlinear characterization of the sum of spaces Ws, p (M, R) + W1, sp (M, R) is also provided.
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