Sharp nonremovability examples for H\"older continuous quasiregular mappings in the plane

Abstract

Let α∈(0,1), K≥ 1, and d=21+α K1+K. Given a compact set E⊂, it is known that if d(E)=0 then E is removable for α-H\"older continuous K-quasiregular mappings in the plane. The sharpness of the index d is shown with the construction, for any t>d, of a set E of Hausdorff dimension (E)=t which is not removable. In this paper, we improve this result and construct compact nonremovable sets E such that 0<d(E)<∞. For the proof, we give a precise planar K-quasiconformal mapping whose H\"older exponent is strictly bigger than 1K, and that exhibits extremal distortion properties.