A reciprocity on finite abelian groups involving zero-sum sequences II
Abstract
Let G be a finite abelian group. For any positive integers d and m, let G(d) be the number of elements in G of order d and M(G,m) be the set of all zero-sum sequences of length m. In this paper, for any finite abelian group H, we prove that | M(G,|H|)|=| M(H,|G|)| if and only if G(d)=H(d) for any d|(|G|,|H|). We also consider an extension of this result to non-abelian groups in terms of invariant theory.
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