AbstractWe calculate the maximal dimension of linear spaces of symmetric and hermitian matrices with given high rank generalizing a well-known result of Adams et al
Let Mn(R) and Sn(R) be the spaces of n × n real matri-ces and real symmetric matrices respectively. ...
International audienceWe investigate constant rank subspaces of symmetric and Hermitian matrices ove...
AbstractWe investigate constant rank subspaces of symmetric and hermitian matrices over finite field...
AbstractWe calculate the maximal dimension of linear spaces of symmetric and hermitian matrices with...
AbstractGiven n∈N, let X be either the set of hermitian or real n×n matrices of rank at least n-1. I...
AbstractLet In denote the space of all n×n symmetric matrices over a field F. Let t be a positive in...
AbstractLet Sn(F) denote the space of all n × n symmetric matrices over the field F. Given a positiv...
41 pages (version 2, minor errors corrected)International audienceLet $r$ and $n$ be positive intege...
41 pages (version 2, minor errors corrected)International audienceLet $r$ and $n$ be positive intege...
AbstractLet In denote the space of all n×n symmetric matrices over a field F. Let t be a positive in...
AbstractLet K be a field and let Mm×n(K) denote the space of m×n matrices over K. We investigate pro...
AbstractWe investigate constant rank subspaces of symmetric and hermitian matrices over finite field...
AbstractWhen min{m, n} = k + 1, the exact value of l(k, m, n), the maximum dimension of all possible...
This paper gives a rigorous and greatly simplified proof of Guttman's theorem for the least upper-bo...
AbstractIn this paper we investigate the maximal dimension for k-spaces of real matrices for small v...
Let Mn(R) and Sn(R) be the spaces of n × n real matri-ces and real symmetric matrices respectively. ...
International audienceWe investigate constant rank subspaces of symmetric and Hermitian matrices ove...
AbstractWe investigate constant rank subspaces of symmetric and hermitian matrices over finite field...
AbstractWe calculate the maximal dimension of linear spaces of symmetric and hermitian matrices with...
AbstractGiven n∈N, let X be either the set of hermitian or real n×n matrices of rank at least n-1. I...
AbstractLet In denote the space of all n×n symmetric matrices over a field F. Let t be a positive in...
AbstractLet Sn(F) denote the space of all n × n symmetric matrices over the field F. Given a positiv...
41 pages (version 2, minor errors corrected)International audienceLet $r$ and $n$ be positive intege...
41 pages (version 2, minor errors corrected)International audienceLet $r$ and $n$ be positive intege...
AbstractLet In denote the space of all n×n symmetric matrices over a field F. Let t be a positive in...
AbstractLet K be a field and let Mm×n(K) denote the space of m×n matrices over K. We investigate pro...
AbstractWe investigate constant rank subspaces of symmetric and hermitian matrices over finite field...
AbstractWhen min{m, n} = k + 1, the exact value of l(k, m, n), the maximum dimension of all possible...
This paper gives a rigorous and greatly simplified proof of Guttman's theorem for the least upper-bo...
AbstractIn this paper we investigate the maximal dimension for k-spaces of real matrices for small v...
Let Mn(R) and Sn(R) be the spaces of n × n real matri-ces and real symmetric matrices respectively. ...
International audienceWe investigate constant rank subspaces of symmetric and Hermitian matrices ove...
AbstractWe investigate constant rank subspaces of symmetric and hermitian matrices over finite field...
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