Pull-back of differential forms by multi-valued Sobolev maps, and the quasiregularity of the multi-valued inverse of a quasiregular map

Abstract

We use Almgren's framework of multi-valued maps to construct a multi-valued inverse F:f() Ad( Rn) of a quasiregular map f: Rn of finite degree d. We then develop a pull-back theory of differential forms on Ad( Rn) by Sobolev maps, and use it to show that the multi-valued inverse is a quasiregular ω-curve (in the sense of Pankka) with respect to a natural n-form ω (suitably interpreted). The pull-back theory is of independent interest, and allows us to conclude e.g. higher Sobolev integrability and quasiminimality of the multi-valued inverse.

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