Asymptotic estimates for double-coverings

Grigori A. Karagulyan; Vahe G. Karagulyan

arXiv:2212.05426·math.CA·December 9, 2025

Asymptotic estimates for double-coverings

Grigori A. Karagulyan, Vahe G. Karagulyan

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TL;DR

This paper studies the asymptotic behavior of the number of equivalence classes of double-coverings with fixed set sizes as the number of sets grows large, and applies findings to hypercontraction inequalities.

Contribution

It characterizes the asymptotic growth of double-coverings and offers a new approach to the Bonami-Kiener hypercontraction inequality.

Findings

01

Derived asymptotic estimates for the number of double-coverings

02

Provided an alternative proof for the hypercontraction inequality

03

Analyzed the structure of equivalence classes of double-coverings

Abstract

A collection of finite sets ${A_{1}, A_{2}, \dots, A_{p}}$ is said to be a double-covering if each $a \in \cup_{k = 1}^{p} A_{k}$ is included in exactly two sets of the collection. For fixed integers $l$ and $p$ , let $μ_{l, p}$ be the number of equivalency classes of double-coverings with $# (A_{k}) = l$ , $k = 1, 2, \dots, p$ . We characterize the asymptotic behavior of the quantity $μ_{l, p}$ as $p \to \infty$ . The results are applied to give an alternative approach to the Bonami-Kiener hypercontraction inequality.

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Taxonomy

TopicsNonlinear Partial Differential Equations · Advanced Mathematical Modeling in Engineering