Inverse results for weighted Harborth constants

TL;DR

This paper investigates inverse problems related to weighted Harborth constants in finite abelian groups, characterizing the structure of sequences lacking zero-subsums, especially for groups combining cyclic and order-two components.

Contribution

It solves inverse problems for weighted Harborth constants in specific finite abelian groups, including those with cyclic and order-two components, and provides results for the weighted Erdős–Ginzburg–Ziv constant.

Findings

Characterization of maximal sequences without zero-subsums for certain groups

Solutions to inverse problems for weighted Harborth constants

Results on the weighted Erdős–Ginzburg–Ziv constant

Abstract

For a finite abelian group $(G,+)$ the Harborth constant is defined as the smallest integer $\ell$ such that each squarefree sequence over $G$ of length $\ell$ has a subsequence of length equal to the exponent of $G$ whose terms sum to $0$. The plus-minus weighted Harborth constant is defined in the same way except that the existence of a plus-minus weighted subsum equaling $0$ is required, that is, when forming the sum one can chose a sign for each term. The inverse problem associated to these constants is the problem of determining the structure of squarefree sequences of maximal length that do not yet have such a zero-subsum. We solve the inverse problems associated to these constant for certain groups, in particular for groups that are the direct sum of a cyclic group and a group of order two. Moreover, we obtain some results for the plus-minus weighted Erd\H{o}s--Ginzburg--Ziv constant.