Conformally invariant complete metrics
Abstract
For a domain G in the one-point compactification Rn = Rn \ ∞\ of Rn, n 2, we characterize the completeness of the modulus metric μG in terms of a potential-theoretic thickness condition of ∂ G\,, Martio's M-condition. Next, we prove that ∂ G is uniformly perfect if and only if μG admits a minorant in terms of a M\"obius invariant metric. Several applications to quasiconformal maps are given.
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