Notes on a special order on $\mathbb{Z}^\infty$
Abstract
In 1958, Helson and Lowdenslager extended the theory of analytic functions to a general class of groups with ordered duals. In this context, analytic functions on such a group are defined as the integrable functions whose Fourier coefficients lie in the positive semigroup of the dual of . In this paper, we found some applications of their theory to infinite-dimensional complex analysis. Specifically, we considered a special order on and corresponding analytic continuous functions on , which serves as the counterpart of the disk algebra in infinitely many variables setting. By characterizing its maximal ideals, we have generalized the following theorem to the infinite-dimensional case: For a positive function that is integrable and log-integrable on , there exists an outer function such that if and only if the support of is a subset of . Furthermore, we have found the counterpart of the above function algebra in the closed right half-plane, and the representing measures of each point in the right half-plane for this algebra. As an application of the order, we provided a new proof of the infinite-dimensional Szeg\"{o}'s theorem.
Cite
@article{arxiv.2502.17018,
title = {Notes on a special order on $\mathbb{Z}^\infty$},
author = {Jiawei Sun and Chao Zu and Yufeng Lu},
journal= {arXiv preprint arXiv:2502.17018},
year = {2025}
}
Comments
This version revises the proof main theorem (Theorem 6.1) due to a fundamental error identified in the original manuscript