Odd Vector Cycles in Zm

Abstract

Given positive integers m and r, define Cm(r) to be the minimum odd number of Zm vectors, each of magnitude r, that together sum to the zero vector. In this article, Cm(r) is investigated for various assignments of m and r. A few previous results are combined to definitively answer the question except in the case of m=3 and the square-free part of r being even and also containing at least one odd prime factor x with x 2 3. We detail the results of a computer-assisted search to determine C3(r) for all r < 106 and then discuss parameterizations of vector cycles in Z3 of length five. We close with a few conjectures and open questions.