Sufficient conditions for convergence of multiple Fourier series with Jk-lacunary sequence of rectangular partial sums in terms of Weyl multipliers

Abstract

We obtain sufficient conditions for convergence (almost everywhere) of multiple trigonometric Fourier series of functions f in L2 in terms of Weyl multipliers. We consider the case where rectangular partial sums of Fourier series Sn(x;f) have indices n=(n1,…,nN) ∈ ZN, N 3, in which k (1≤ k≤ N-2) components on the places \j1,…,jk\=Jk ⊂ \1,…,N\ = M are elements of (single) lacunary sequences (i.e., we consider the, so called, multiple Fourier series with Jk-lacunary sequence of partial sums). We prove that for any sample Jk⊂ M the Weyl multiplier for convergence of these series has the form W()=Π j=1N-k (|αj|+2), where αj∈ M Jk , =(1,…,N)∈ ZN. So, the "one-dimensional" Weyl multiplier -- (|·|+2) -- presents in W() only on the places of "free" (nonlacunary) components of the vector . Earlier, in the case where N-1 components of the index n are elements of lacunary sequences, convergence almost everywhere for multiple Fourier series was obtained in 1977 by M.Kojima in the classes Lp, p>1, and by D.K.Sanadze, Sh.V.Kheladze in Orlizc class. Note, that presence of two or more "free" components in the index n (as follows from the results by Ch.Fefferman (1971)) does not guarantee the convergence almost everywhere of Sn(x;f) for N≥ 3 even in the class of continuous functions.