A quasiconformal composition problem for the Q-spaces

Abstract

Given a quasiconformal mapping f: Rn Rn with n2, we show that (un-)boundedness of the composition operator Cf on the spaces Qα( Rn) depends on the index α and the degeneracy set of the Jacobian Jf. We establish sharp results in terms of the index α and the local/global self-similar Minkowski dimension of the degeneracy set of Jf. This gives a solution to [Problem 8.4, 3] and also reveals a completely new phenomenon, which is totally different from the known results for Sobolev, BMO, Triebel-Lizorkin and Besov spaces. Consequently, Tukia-V\"ais\"al\"a's quasiconformal extension f: Rn Rn of an arbitrary quasisymmetric mapping g: Rn-p Rn-p is shown to preserve Qα ( Rn) for any (α,p)∈ (0,1)×[2,n)(0,1/2)×\1\. Moreover, Qα( Rn) is shown to be invariant under inversions for all 0<α<1.