The Sobolev space W21/2: Simultaneous improvement of functions by a homeomorphism of the circle

Abstract

It is known that for every continuous real-valued function f on the circle T= R/2π Z there exists a change of variable, i.e., a self-homeomorphism h of T, such that the superposition f h is in the Sobolev space W21/2( T). We obtain new results on simultaneous improvement of functions by a single change of variable in relation to the space W21/2( T). The main result is as follows: there does not exist a self-homeomorphism h of T such that f h∈ W21/2( T) for every f∈ Lip1/2( T). Here Lip1/2( T) is the class of all functions on T satisfying the Lipschitz condition of order 1/2.