On the heterogeneous distortion inequality

Abstract

We study Sobolev mappings f ∈ Wloc1,n (Rn, Rn), n 2, that satisfy the heterogeneous distortion inequality \[|Df(x)|n ≤ K Jf(x) + σn(x) |f(x)|n\] for almost every x ∈ Rn. Here K ∈ [1, ∞) is a constant and σ ≥ 0 is a function in Lnloc(Rn). Although we recover the class of K-quasiregular mappings when σ 0, the theory of arbitrary solutions is significantly more complicated, partly due to the unavailability of a robust degree theory for non-quasiregular solutions. Nonetheless, we obtain a Liouville-type theorem and the sharp H\"older continuity estimate for all solutions, provided that σ ∈ Ln-(Rn) Ln+(Rn) for some >0. This gives an affirmative answer to a question of Astala, Iwaniec and Martin.