Fractional Sobolev Regularity for the Brouwer Degree

Abstract

We prove that if ⊂ Rn is a bounded open set and nα> dimb (∂ ) = d, then the Brouwer degree deg(v,,·) of any H\"older function v∈ C0,α (, Rn) belongs to the Sobolev space Wβ, p ( Rn) for every 0≤ β < np - dα. This extends a summability result of Olbermann and in fact we get, as a byproduct, a more elementary proof of it. Moreover we show the optimality of the range of exponents in the following sense: for every β≥ 0 and p≥ 1 with β > np - n-1α there is a vector field v∈ C0, α (B1, Rn) with deg\, (v, , ·) Wβ, p, where B1 ⊂ Rn is the unit ball.