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The Hadamard conjecture and integer lattices
Part of:
Designs and configurations
Published online by Cambridge University Press: 09 April 2009
Abstract
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Let L be an integer lattice, and S a set of lattice points in L. We say that S is optimal if it minimises the number of rectangular sublattices of L (including degenerate ones) which contain an even number of points in S. We show that the resolution of the Hadamard conjecture is equivalent to the determination of |S| for an optimal set S in a (4s-1) × (4s-1) integer lattice L. We then specialise to the case of 1 × n integer lattices, characterising and enumerating their optimal sets.
MSC classification
Secondary:
05B20: Matrices (incidence, Hadamard, etc.)
- Type
- Research Article
- Information
- Copyright
- Copyright © Australian Mathematical Society 1987
References
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