On the Davenport constant and on the structure of extremal zero-sum free sequences
Abstract
Let G = Cn1 ... Cnr with 1 < n1 ... nr be a finite abelian group, d* (G) = n1 + ... + nr - r, and let d (G) denote the maximal length of a zero-sum free sequence over G. Then d (G) d* (G), and the standing conjecture is that equality holds for G = Cnr. We show that equality does not hold for C2 C2nr, where n 3 is odd and r 4. This gives new information on the structure of extremal zero-sum free sequences over C2nr.
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