On the index conjecture in zero-sum theory: singular case
classification
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indexconjecturesingularthenzero-sumcasecdotscyclic
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Let $S=(a_1)\cdots(a_k)$ be a minimal zero-sum sequence over a finite cyclic group $G$. The index conjecture states that if $k=4$ and $\gcd(|G|,6)=1$, then $S$ has index $1$. In this paper we prove that if $S$ is singular then the index of $S$ is $1$.
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