The Bohr--P\'al Theorem and the Sobolev Space W21/2

Abstract

The well-known Bohr--P\'al theorem asserts that for every continuous real-valued function f on the circle T there exists a change of variable, i.e., a homeomorphism h of T onto itself, such that the Fourier series of the superposition f h converges uniformly. Subsequent improvements of this result imply that actually there exists a homeomorphism that brings f into the Sobolev space W21/2( T). This refined version of the Bohr--P\'al theorem does not extend to complex-valued functions. We show that if α<1/2, then there exists a complex-valued f that satisfies the Lipschitz condition of order α and at the same time has the property that f h W21/2( T) for every homeomorphism h of T.