Sobolev embedding for M1,p spaces is equivalent to a lower bound of the measure
Abstract
It has been known since 1996 that a lower bound for the measure, μ(B(x,r))≥ brs, implies Sobolev embedding theorems for Sobolev spaces M1,p defined on metric-measure spaces. We prove that, in fact Sobolev embeddings for M1,p spaces are equivalent to the lower bound of the measure.
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