Finding a Vector Orthogonal to Roughly Half a Collection of Vectors

Dimitri Grigoriev has shown that for any family of $N$ vectors in the $d$-dimensional linear space $E=(\ff{2})^d$, there exists a vector in $E$ which is orthogonal to at least $N/3$ and at most $2N/3$ vectors of the family. We show that the range $[N/3,2N/3]$ can be replaced by the much smaller range $[N/2-\sqrt{N}/2,N/2+\sqrt{N}/2]$ and we give an efficient, deterministic parallel algorithm which finds a vector achieving this bound. The optimality of the bound is also investigated.

Domaines

Complexité [cs.CC] Mathématique discrète [cs.DM]

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https://hal-lirmm.ccsd.cnrs.fr/lirmm-00292703

Soumis le : mercredi 2 juillet 2008-14:27:26

Dernière modification le : jeudi 11 mai 2023-11:56:10

Archivage à long terme le : vendredi 28 mai 2010-21:23:09

Dates et versions

lirmm-00292703 , version 1 (02-07-2008)

Identifiants

HAL Id : lirmm-00292703 , version 1
DOI : 10.1016/j.jco.2006.09.005

Citer

Pierre Charbit, Emmanuel Jeandel, Pascal Koiran, Sylvain Perifel, Stéphan Thomassé. Finding a Vector Orthogonal to Roughly Half a Collection of Vectors. Journal of Complexity, 2008, 24, pp.39-53. ⟨10.1016/j.jco.2006.09.005⟩. ⟨lirmm-00292703⟩

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