Extremal product-one free sequences in Cq s Cm
Abstract
Let G be a finite group, written multiplicatively. The Davenport constant of G is the smallest positive integer d such that every sequence of G with d elements has a non-empty subsequence with product 1. Let Cn Zn be the cyclic group of order n. Bass (2007) showed that the Davenport constant of the metacyclic group Cq s Cm, where q is a prime number and ordq(s) = m 2, is m+q-1. In this paper, we explicit the form of all sequences S of Cq s Cm, with q+m-2 elements, that are free of product-1 subsequences.
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