Abstract 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 α 1, . . . , α N 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 boun...
An arrangement of hyperplanes (or just an arrangement) A is a finite collection of linear subspaces ...
The characteristic polynomial P_A(x_0, . . . , x_r) of an r-tuple A := (A_1, . . ., A_r) of n imes ...
AbstractThe main object of this paper is to investigate several general families of hypergeometric p...
Abstract We fix three natural numbers k, n, N, such that n+k+1 = N, and introduce the notion of two ...
We fix three natural numbers k, n,N, such that n + k + 1 = N, and introduce the notion of two dual a...
AbstractThis is an outline of the Aomoto–Gelfand theory of multivariable hypergeometric integrals an...
AbstractIn work on critical values of linear functions and hyperplane arrangements, A. Varchenko (Iz...
AbstractGiven a hyperplane arrangement A of Rn whose defining equations have integer coefficients, t...
In the present note we study determinantal arrangements constructed with use of the $3$-minors of a ...
AbstractIn an earlier paper [D. Richards, Q. Zheng, Determinant formulas for multidimensional hyperg...
AbstractLet W be a finite Weyl group and A be the corresponding Weyl arrangement. A deformation of A...
AbstractAn interrelationship between the numerical range of matrix polynomials and its factorization...
If $\Phi_\lambda$ is a master function corresponding to a hyperplane arrangement $\mathcal A$ and a ...
We argue that one can factorize the difference equation of hypergeometric type on the nonuniform lat...
summary:The main object of this paper is to investigate several general families of hypergeometric p...
An arrangement of hyperplanes (or just an arrangement) A is a finite collection of linear subspaces ...
The characteristic polynomial P_A(x_0, . . . , x_r) of an r-tuple A := (A_1, . . ., A_r) of n imes ...
AbstractThe main object of this paper is to investigate several general families of hypergeometric p...
Abstract We fix three natural numbers k, n, N, such that n+k+1 = N, and introduce the notion of two ...
We fix three natural numbers k, n,N, such that n + k + 1 = N, and introduce the notion of two dual a...
AbstractThis is an outline of the Aomoto–Gelfand theory of multivariable hypergeometric integrals an...
AbstractIn work on critical values of linear functions and hyperplane arrangements, A. Varchenko (Iz...
AbstractGiven a hyperplane arrangement A of Rn whose defining equations have integer coefficients, t...
In the present note we study determinantal arrangements constructed with use of the $3$-minors of a ...
AbstractIn an earlier paper [D. Richards, Q. Zheng, Determinant formulas for multidimensional hyperg...
AbstractLet W be a finite Weyl group and A be the corresponding Weyl arrangement. A deformation of A...
AbstractAn interrelationship between the numerical range of matrix polynomials and its factorization...
If $\Phi_\lambda$ is a master function corresponding to a hyperplane arrangement $\mathcal A$ and a ...
We argue that one can factorize the difference equation of hypergeometric type on the nonuniform lat...
summary:The main object of this paper is to investigate several general families of hypergeometric p...
An arrangement of hyperplanes (or just an arrangement) A is a finite collection of linear subspaces ...
The characteristic polynomial P_A(x_0, . . . , x_r) of an r-tuple A := (A_1, . . ., A_r) of n imes ...
AbstractThe main object of this paper is to investigate several general families of hypergeometric p...