In Metric-measure Spaces Sobolev Embedding is Equivalent to a Lower Bound for the Measure |
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| Authors: | Przemysław Górka |
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| Affiliation: | 1.Department of Mathematics, Information Sciences,Warsaw University of Technology,Warsaw,Poland |
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| Abstract: | ![]()
We study Sobolev inequalities on doubling metric measure spaces. We investigate the relation between Sobolev embeddings and lower bound for measure. In particular, we prove that if the Sobolev inequality holds, then the measure μ satisfies the lower bound, i.e. there exists b such that μ(B(x,r))≥b r α for r∈(0,1] and any point x from metric space. |
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