We generalise the Vandermonde determinant identity to one which tests whether a family of hypersurfaces in $\bP^n$ has an unexpected intersection point. The intended application is an asymptotic estimate of the volume of certain spaces of homogeneous polynomials on an embedded projective variety
ABSTRACT. Let K be the closure of a bounded open set with smooth boundary in Cn. A Fekete configurat...
AbstractThe aim of this article is to give explicit formulas for several Cauchy-Vandermonde determin...
AbstractThe hypersurfaces of degree d in the projective space Pn correspond to points of PN, where N...
We generalise the Vandermonde determinant identity to one which tests whether a family of hypersurfa...
Given n ≥ 2 let a denote an increasing n-tuple of non-negative integers ai and let x denote an n-tup...
We prove that for almost square tensor product grids and certain sets of bivariate polynomials the V...
This thesis discusses the extreme points of the Vandermonde determinant on various surfaces, their a...
A few remarks on “On certain Vandermonde determinants whose variables separate" André Pierro de...
Motivated by the famous Skolem-Mahler-Lech theorem we initiate in this paper the study of a natural ...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Let X be a subvariety of Pn defined over a number field and N(B) be the number of rational points of...
This thesis presents various results concerning the density of rational and integral points on algeb...
We study the number of representations of an integer n=F(x) by a homogeneous form in sufficiently ma...
AbstractWe describe how points may be placed on collections of algebraic varieties so that the resul...
We find geometric and arithmetic conditions in order to characterize the irreducibility of the deter...
ABSTRACT. Let K be the closure of a bounded open set with smooth boundary in Cn. A Fekete configurat...
AbstractThe aim of this article is to give explicit formulas for several Cauchy-Vandermonde determin...
AbstractThe hypersurfaces of degree d in the projective space Pn correspond to points of PN, where N...
We generalise the Vandermonde determinant identity to one which tests whether a family of hypersurfa...
Given n ≥ 2 let a denote an increasing n-tuple of non-negative integers ai and let x denote an n-tup...
We prove that for almost square tensor product grids and certain sets of bivariate polynomials the V...
This thesis discusses the extreme points of the Vandermonde determinant on various surfaces, their a...
A few remarks on “On certain Vandermonde determinants whose variables separate" André Pierro de...
Motivated by the famous Skolem-Mahler-Lech theorem we initiate in this paper the study of a natural ...
Recently we gave a simple, geometric and explicit construction of bivariate interpolation at points ...
Let X be a subvariety of Pn defined over a number field and N(B) be the number of rational points of...
This thesis presents various results concerning the density of rational and integral points on algeb...
We study the number of representations of an integer n=F(x) by a homogeneous form in sufficiently ma...
AbstractWe describe how points may be placed on collections of algebraic varieties so that the resul...
We find geometric and arithmetic conditions in order to characterize the irreducibility of the deter...
ABSTRACT. Let K be the closure of a bounded open set with smooth boundary in Cn. A Fekete configurat...
AbstractThe aim of this article is to give explicit formulas for several Cauchy-Vandermonde determin...
AbstractThe hypersurfaces of degree d in the projective space Pn correspond to points of PN, where N...
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