On the composition operators on Besov and Triebel-Lizorkin spaces of power weights

Abstract

Let G:R→ R be a continuous function. Under some assumptions on G, s,α ,p and q we prove that equation* \G(f):f∈ Ap,qs(Rn,|· |α )\⊂ Ap,qs(Rn,|· |α ) equation* implies G is a linear function. Here Ap,qs(Rn,|·|α ) stands for either the Besov space Bp,qs(Rn,|· |α ) or the Triebel-Lizorkin space Fp,qs(Rn,|· |α ). These spaces unify and generalize many classical function spaces such as Sobolev spaces of power weights. One of the main difficulties to study this problem is that the norm of the Ap,qs(Rn,|· |α ) spaces with α ≠ 0 is not translation invariant, so some new techniques must be developed.