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The connectivity at infinity of a manifold and $L^{q,p}$-Sobolev inequalities
Published 11 Jul 2010 in math.DG | (1007.1761v3)
Abstract: The purpose of this paper is to give a self-contained proof that a complete manifold with more than one end never supports an $L{q,p}$-Sobolev inequality ($2 \leq p$, $q\leq p{*}$), provided the negative part of its Ricci tensor is small (in a suitable spectral sense). In the route, we discuss potential theoretic properties of the ends of a manifold enjoying an $L{q,p}$-Sobolev inequality.
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