We fix three natural numbers k, n,N, such that n + k + 1 = N, and introduce the notion of two dual arrangements of hyperplanes. One of the arrangements is an arrangement of N hyperplanes in a k-dimensional affine space, the other is an arrangement of N hyperplanes in an n-dimensional affine space. We assign weights α1, . . . , αN to the hyperplanes of the arrangements and for each of the arrangements consider the associated period matrices. The first is a matrix of k-dimensional hypergeometric integrals and the second is a matrix of n-dimensional hypergeometric integrals. The size of each matrix is equal to the number of bounded domains of the corresponding arrangement. We show that the dual arrangements have the same number of bounded doma...
Dans cette thèse, on s'intéresse à des questions relatives aux arrangements d'hyperplans du point de...
Information about the nullspace and Smith normal form of the Varchenko matrix B(q) of a hyperplane a...
Let V be a finite vector space of dimension n over the field K. A hyperplane in V is an n − 1 dimens...
We fix three natural numbers k, n,N, such that n + k + 1 = N, and introduce the notion of two dual a...
Abstract We fix three natural numbers k, n, N, such that n+k+1 = N, and introduce the notion of two ...
AbstractThis is an outline of the Aomoto–Gelfand theory of multivariable hypergeometric integrals an...
AbstractIn an earlier paper [D. Richards, Q. Zheng, Determinant formulas for multidimensional hyperg...
AbstractIn work on critical values of linear functions and hyperplane arrangements, A. Varchenko (Iz...
AbstractIn this article we derive closed-form determinant formulas for certain period matrices whose...
In an earlier paper (Adv. Appl. Math. 29 (2002), 137{151) on the determinants of certain period matr...
The Varchenko determinant is the determinant of a matrix defined from an arrangement of hyperplanes....
We study a certain family of hypersurface arrangements known as determinantal arrangements. Determin...
In this paper, we first consider the arrangement of hyperplanes and then the corresponding oriented ...
We generalize the (signed) Varchenko matrix of a hyperplane arrangement to complexes of oriented mat...
AbstractGiven a hyperplane arrangement A of Rn whose defining equations have integer coefficients, t...
Dans cette thèse, on s'intéresse à des questions relatives aux arrangements d'hyperplans du point de...
Information about the nullspace and Smith normal form of the Varchenko matrix B(q) of a hyperplane a...
Let V be a finite vector space of dimension n over the field K. A hyperplane in V is an n − 1 dimens...
We fix three natural numbers k, n,N, such that n + k + 1 = N, and introduce the notion of two dual a...
Abstract We fix three natural numbers k, n, N, such that n+k+1 = N, and introduce the notion of two ...
AbstractThis is an outline of the Aomoto–Gelfand theory of multivariable hypergeometric integrals an...
AbstractIn an earlier paper [D. Richards, Q. Zheng, Determinant formulas for multidimensional hyperg...
AbstractIn work on critical values of linear functions and hyperplane arrangements, A. Varchenko (Iz...
AbstractIn this article we derive closed-form determinant formulas for certain period matrices whose...
In an earlier paper (Adv. Appl. Math. 29 (2002), 137{151) on the determinants of certain period matr...
The Varchenko determinant is the determinant of a matrix defined from an arrangement of hyperplanes....
We study a certain family of hypersurface arrangements known as determinantal arrangements. Determin...
In this paper, we first consider the arrangement of hyperplanes and then the corresponding oriented ...
We generalize the (signed) Varchenko matrix of a hyperplane arrangement to complexes of oriented mat...
AbstractGiven a hyperplane arrangement A of Rn whose defining equations have integer coefficients, t...
Dans cette thèse, on s'intéresse à des questions relatives aux arrangements d'hyperplans du point de...
Information about the nullspace and Smith normal form of the Varchenko matrix B(q) of a hyperplane a...
Let V be a finite vector space of dimension n over the field K. A hyperplane in V is an n − 1 dimens...