The lattice of arithmetic progressions

Marcel K. Goh; Jad Hamdan; and Jonah Saks

arXiv:2106.05949·math.CO·October 10, 2022

The lattice of arithmetic progressions

Marcel K. Goh, Jad Hamdan, and Jonah Saks

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TL;DR

This paper studies the lattice of arithmetic progressions within a set, revealing its combinatorial properties, M"obius function relation to number theory, and topological structure, including contractibility or sphere-like homotopy.

Contribution

It provides three proofs of the M"obius function relation, establishes that the lattice is comodernistic and EL-labelable, and analyzes its topological structure.

Findings

01

The M"obius function of the lattice equals the classical number-theoretic M"obius function for n≥2.

02

The lattice is comodernistic and EL-labelable.

03

The order complex is either contractible or homotopy equivalent to a sphere.

Abstract

This paper concerns the lattice $L_{n}$ of subsets of ${1, \dots, n}$ that are arithmetic progressions, under the inclusion order. For $n \geq 4$ , this poset is not graded and thus not semimodular. We give three independent proofs of the fact that for $n \geq 2$ , $μ_{n} (L_{n}) = μ (n - 1)$ , where $μ_{n}$ is the M\"obius function of $L_{n}$ and $μ$ is the classical (number-theoretic) M\"obius function. We also show that $L_{n}$ is comodernistic, which implies that $L_{n}$ is EL-labelable. Comodernism is then used to prove that the order complex $Δ_{n}$ of the lattice is either contractible or homotopy equivalent to a sphere.

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Taxonomy

TopicsLimits and Structures in Graph Theory · Analytic Number Theory Research · Mathematical Dynamics and Fractals