Absolutely convergent Fourier series. An improvement of the Beurling--Helson theorem

Abstract

We consider the space A( T) of all continuous functions f on the circle T such that the sequence of Fourier coefficients f=\f(k), ~k ∈ Z\ belongs to l1( Z). The norm on A( T) is defined by \|f\|A( T)=\|f\|l1( Z). According to the known Beurling--Helson theorem, if φ : T→ T is a continuous mapping such that \|einφ\|A( T)=O(1), ~n∈ Z, then φ is linear. It was conjectured by Kahane that the same conclusion about φ is true under the assumption that \|einφ\|A( T)=o( |n|). We show that if \|einφ\|A( T)=o(( |n|/ |n|)1/12) then φ is linear.