Subset sums in abelian groups

Subset sums in abelian groups

Denoting by Sigma(S) the set of subset sums of a subset S of a finite abelian group G, we prove that |Sigma(S)| >= |S|(|S|+2)/4-1 whenever S is symmetric, |G| is odd and Sigma(S) is aperiodic. Up to an additive constant of 2 this result is best possible, and we obtain the stronger (exact best pos...

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Veröffentlicht in:arXiv.org 2011-12
Hauptverfasser: Balandraud, Eric, Girard, Benjamin, Griffiths, Simon, Yahya Ould Hamidoune
Format: Artikel
Sprache:eng
Schlagworte:
Group theory
Mathematics - Combinatorics
Mathematics - Group Theory
Mathematics - Number Theory
Sums
Theorems
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Zusammenfassung:Denoting by Sigma(S) the set of subset sums of a subset S of a finite abelian group G, we prove that |Sigma(S)| >= |S|(|S|+2)/4-1 whenever S is symmetric, |G| is odd and Sigma(S) is aperiodic. Up to an additive constant of 2 this result is best possible, and we obtain the stronger (exact best possible) bound in almost all cases. We prove similar results in the case |G| is even. Our proof requires us to extend a theorem of Olson on the number of subset sums of anti-symmetric subsets S from the case of Z_p to the case of a general finite abelian group. To do so, we adapt Olson's method using a generalisation of Vosper's Theorem proved by Hamidoune and Plagne.
ISSN:2331-8422
DOI:10.48550/arxiv.1112.1929