Yahya Ould Hamidoune scite author profile

Let A be a finite subset of Zp (where p is a prime). Erdös and Heilbronn conjectured (1964) that the set of sums of the 2‐subsets of A has cardinality at least min(p, 2|A| — 3). We show here that the set of sums of all m‐subsets of A has cardinality at least min {p,m(|A| — m)+ 1}. In particular, we answer affirmatively the above conjecture. We apply this result to the problem of finding the smallest n such that for every subset 5 of cardinality n and every x∈Zp there is a subset of S with sum equal to x. On this last problem we improve the known results due to Erdös and Heilbronn and to Olson. The above result will be derived from the following general problem on Grassmann spaces. Let F be a field and let V be a finite dimensional vector space of dimension d over F. Let p be the characteristic of F in nonzero characteristic and ∞ otherwise. Let Df be the derivative of a linear operatorfon V, restricted to the mth Grassmann space ∧mV. We show that there is a cyclic subspace for the derivative with dimension at least min {p,m(n−m) + 1}, where n is the maximum dimension of the cyclic subspaces of f. This bound is sharp and is reached when f has d distinct eigenvalues forming an arithmetic progression.

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An Isoperimetric Method in Additive Theory

Hamidoune

1996

Journal of Algebra

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On the Connectivity of Cayley Digraphs

Hamidoune

1984

European Journal of Combinatorics

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Representing a planar graph by vertical lines joining different levels

Duchet

Hamidoune

Vergnas

et al. 1983

Discrete Mathematics

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Subsets with Small Sums in Abelian Groups' I: the Vosper Property

Hamidoune

1997

European Journal of Combinatorics

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