Exceptional Sets for Quasiconformal Mappings in General Metric Spaces II
Abstract
A homemorphism between domains in Rn, n 2 is quasiconformal, with its intricate analytic and geometric consequences, if the (pointwise) linear dilatation -- a purely metric quantity -- is uniformly bounded. Gehring proved that it will suffice to verify the uniform bound up to a set of measure zero as long as we can show that the dilatation is finite outside a subset of finite Hausdorff--(n-1) measure. In short, we say that we can allow an exceptional codimension 1 subset. In the metric setting, it has been proved, roughly speaking, that one can allow an exceptional codimension p subset, p 1, if the source space satisfies a p-Poincar\'e inequality. We prove, effectively, the sharpness of the latter claim.
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