Estimates in Beurling--Helson type theorems. Multidimensional case

Abstract

We consider the spaces Ap( Tm) of functions f on the m -dimensional torus Tm such that the sequence of the Fourier coefficients f=\f(k), ~k ∈ Zm\ belongs to lp( Zm), ~1≤ p<2. The norm on Ap( Tm) is defined by \|f\|Ap( Tm)=\|f\|lp( Zm). We study the rate of growth of the norms \|eiλ\|Ap( Tm) as |λ|→ ∞, ~λ∈ R, for C1 -smooth real functions on Tm (the one-dimensional case was investigated by the author earlier). The lower estimates that we obtain have direct analogues for the spaces Ap( Rm).