Non-removability of Sierpinski spaces
Abstract
We prove that all Sierpi\'nski spaces in Sn, n≥ 2, are non-removable for (quasi)conformal maps, generalizing the result of the first named author arXiv:1809.05605. More precisely, we show that for any Sierpi\'nski space X⊂ Sn there exists a homeomorphism f Sn Sn, conformal in Sn X, that maps X to a set of positive measure and is not globally (quasi)conformal. This is the first class of examples of non-removable sets in higher dimensions.
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