On a problem of Nathanson on non-minimal additive complements

Shi--Qiang Chen; Yuchen Ding

arXiv:2407.04388·math.NT·July 29, 2024

On a problem of Nathanson on non-minimal additive complements

Shi--Qiang Chen, Yuchen Ding

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TL;DR

This paper investigates conditions under which certain integer sets lack minimal additive complements, extending previous results and addressing a problem posed by Nathanson.

Contribution

It provides sufficient conditions for sets W to have no minimal additive complements, advancing understanding of additive complement structures.

Findings

01

Identifies conditions where W has no minimal additive complements

02

Extends prior results of Chen and Yang

03

Partially answers Nathanson's problem

Abstract

Let $C$ and $W$ be two sets of integers. If $C + W = Z$ , then $C$ is called an additive complement to $W$ . We further call $C$ a minimal additive complement to $W$ if no proper subset of $C$ is an additive complement to $W$ . Answering a problem of Nathanson in part, we give sufficient conditions of $W$ which has no minimal additive complements. Our result also extends the prior result of Chen and Yang.

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Taxonomy

TopicsAdvanced Algebra and Logic · Rings, Modules, and Algebras · Advanced Topology and Set Theory