The Erdos-Ginzburg-Ziv constant of rank-two-like p-groups
Abstract
Adapting Reiher's proof of Kemnitz's conjecture, we obtain two refinements of a theorem of Schmid and Zhuang. Our main results provide improved upper bounds for the Erdos-Ginzburg-Ziv constant of rank-two-like p-groups, and their direct products with cyclic groups of order coprime to p. In particular, we determine the exact value of this constant, and also confirm a conjecture of Gao, for a new infinite family of groups of arbitrarily large rank.
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