On limiting relations for capacities
Abstract
The paper is devoted to the study of limiting behaviour of Besov capacities (E;Bp,q) (0<<1) of sets in n as 1 or 0. Namely, let E⊂ n and Jp,q(, E)=[(1-)q]p/q(E;Bp,q). It is proved that if 1 p<n, 1 q<∞, and the set E is open, then Jp,q(, E) tends to the Sobolev capacity (E;Wp1) as 1. This statement fails to hold for compact sets. Further, it is proved that if the set E is compact and 1 p,q<∞, then Jp,q(, E) tends to 2np|E| as 0 (|E| is the measure of E). For open sets it is not true.
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