A Combinatorial Problem on Finite Abelia
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W.D. Gao
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Article
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1996
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Elsevier Science
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English
β 186 KB
In this paper the following theorem is proved. Let G be a finite Abelian group of order n. Then, n+D(G )&1 is the least integer m with the property that for any sequence of m elements a 1 , ..., a m in G, 0 can be written in the form 0= a 1 + } } } +a in with 1 i 1 < } } } <i n m, where D(G) is the