AbstractThe present article represents the next step in our ongoing program of classifying the correlations of finite Desarguesian planes.We show that in PG(2,q2n), the correlations defined by diagonal matrices, with companion automorphism (qm), where (m,2n)=1, have the following numbers of absolute points:q2n+qn+2-qn+1+1orq2n-qn+1+qn+1or(qn+1)2fornodd;q2n-qn+2+qn+1+1orq2n+qn+1-qn+1or(qn-1)2forneven.We also discuss the equivalence classes into which these correlations fall, as well as the configurations of their sets of absolute points
Correlation matrices—symmetric positive semidefinite matrices with unit diagonal— are important in s...
Decomposition into a direct sum of irreducible representations of the representation of the full col...
AbstractWe study the binary dual codes associated with Desarguesian projective planes PG(2,q), with ...
AbstractThe present article represents the next step in our ongoing program of classifying the corre...
AbstractAs a first step towards the general classification of correlations of finite Desarguesian pl...
AbstractDecomposition into a direct sum of irreducible representations of the representation of the ...
The correlational structure of a set of variables is often conveniently described by the pairwise pa...
[[abstract]]An $n \times n$ complex Hermitian or real symmetric matrix is a correlation matrix if it...
International audienceKenyon and Pemantle (2014) gave a formula for the entries of a square matrix i...
We study two and four points correlation functions for two dimensional Ising spins on the generalize...
AbstractFor a projective plane over a field F, we classify all asymmetric linear correlations up to ...
Investigation in the field of birational geometry of algebraic multiplicities has been conducted. Th...
AbstractLet 1⩽k⩽n/2, andA=A11A12[−1pt]A21A22be an n×n positive definite matrix so that A11 is k×k. S...
YesThe Desargues property is well known in the context of projective geometry. An analogous propert...
Correlation matrices---symmetric positive semidefinite matrices with unit diagonal---are important ...
Correlation matrices—symmetric positive semidefinite matrices with unit diagonal— are important in s...
Decomposition into a direct sum of irreducible representations of the representation of the full col...
AbstractWe study the binary dual codes associated with Desarguesian projective planes PG(2,q), with ...
AbstractThe present article represents the next step in our ongoing program of classifying the corre...
AbstractAs a first step towards the general classification of correlations of finite Desarguesian pl...
AbstractDecomposition into a direct sum of irreducible representations of the representation of the ...
The correlational structure of a set of variables is often conveniently described by the pairwise pa...
[[abstract]]An $n \times n$ complex Hermitian or real symmetric matrix is a correlation matrix if it...
International audienceKenyon and Pemantle (2014) gave a formula for the entries of a square matrix i...
We study two and four points correlation functions for two dimensional Ising spins on the generalize...
AbstractFor a projective plane over a field F, we classify all asymmetric linear correlations up to ...
Investigation in the field of birational geometry of algebraic multiplicities has been conducted. Th...
AbstractLet 1⩽k⩽n/2, andA=A11A12[−1pt]A21A22be an n×n positive definite matrix so that A11 is k×k. S...
YesThe Desargues property is well known in the context of projective geometry. An analogous propert...
Correlation matrices---symmetric positive semidefinite matrices with unit diagonal---are important ...
Correlation matrices—symmetric positive semidefinite matrices with unit diagonal— are important in s...
Decomposition into a direct sum of irreducible representations of the representation of the full col...
AbstractWe study the binary dual codes associated with Desarguesian projective planes PG(2,q), with ...