Remainder terms in the fractional Sobolev inequality
Abstract
We show that the fractional Sobolev inequality for the embedding L2NN-s(N), s ∈ (0,N) can be sharpened by adding a remainder term proportional to the distance to the set of optimizers. As a corollary, we derive the existence of a remainder term in the weak LNN-s-norm for functions supported in a domain of finite measure. Our results generalize earlier work for the non-fractional case where s is an even integer.
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