On removability of isolated singularities of classes Orlicz - Sobolev
Abstract
We study the local behavior of the closed-open discrete maps of Orlich--Sobolev classes in Rn, n≥slant 3. It was found that these mappings f have continuous extension in isolated point x0 in D\x0 \, as soon as their dilatation of order p∈ (n-1, n] has the majorant of class FMO at said point, and moreover, limits set of mapping f at x0 and ∂ D are disjoint.
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