Weak Limits of Fractional Sobolev Homeomorphisms are Almost Injective: A Note

Abstract

Let ⊂ Rn be an open set and fk ∈ Ws,p(;Rn) be a sequence of homeomorphisms weakly converging to f ∈ Ws,p(;Rn). It is known that if s=1 and p > n-1 then f is injective almost everywhere in the domain and the target. In this note we extend such results to the case s∈(0,1) and sp > n-1. This in particular applies to Cs-H\"older maps.