English

On limiting relations for capacities

Classical Analysis and ODEs 2012-08-10 v1

Abstract

The paper is devoted to the study of limiting behaviour of Besov capacities \capa(E;Bp,q\a)(0<\a<1)\capa (E;B_{p,q}^\a) (0<\a<1) of sets in Rn\R^n as \a1\a\to 1 or \a0.\a\to 0. Namely, let ERnE\subset \R^n and Jp,q(\a,E)=[\a(1\a)q]p/q\capa(E;Bp,q\a).J_{p,q}(\a, E)=[\a(1-\a)q]^{p/q}\capa(E;B_{p,q}^\a). It is proved that if 1p<n,1q<,1\le p<n, 1\le q<\infty, and the set EE is open, then Jp,q(\a,E)J_{p,q}(\a, E) tends to the Sobolev capacity \capa(E;Wp1)\capa(E;W_p^1) as \a1\a\to 1. This statement fails to hold for compact sets. Further, it is proved that if the set EE is compact and 1p,q<1\le p,q<\infty, then Jp,q(\a,E)J_{p,q}(\a, E) tends to 2npE2n^p|E| as \a0\a\to 0 (E|E| is the measure of EE). For open sets it is not true.

Cite

@article{arxiv.1208.1938,
  title  = {On limiting relations for capacities},
  author = {V. I. Kolyada},
  journal= {arXiv preprint arXiv:1208.1938},
  year   = {2012}
}

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To appear in Real Analysis Exchange

R2 v1 2026-06-21T21:48:27.886Z