The first Szego limit theorem on multi-dimensional torus

Abstract

In this paper, we consider the first Szego limit theorems on d-torus Td for 1≤ d≤ +∞. It is shown that for any Flner sequence \σN\ of Zd and ∈ L1+(Td), it holds that N→ ∞( TσN)1|σN|=(∫Td ~dmd). In the case d=+∞, we are associated with multiplicative Toeplitz matrix T =\(j/i)\i,j∈N and the most concerned non-Flner truncation, that is, TN =\(j/i)\1≤ i,j≤ N, where σN=\1,…,N\. It is shown that for each ∈ L∞R(T∞) and f∈ C[ess-inf ~,~ess-sup~], the limit N→ ∞ 1NTr f (TN ) exsits. Moreover, it is proven that the limit N→ ∞( TN )1N exists for any ∈ L1+(T∞) with strictly positive essential infimum. These results are directly related to two problems posed by Nikolski and Pushnitski.