Add to ORKGAbstract. We prove that for any finite real hyperplane arrangement the av-erage projection volumes of the maximal cones is given by the coefficients of the characteristic polynomial of the arrangement. This settles the conjecture of Drton and Klivans that this held for all finite real reflection arrangements. The methods used are geometric and combinatorial. As a consequence we determine that the angle sums of a zonotope are given by the characteristic polynomial of the order dual of the intersection lattice of the arrangement. 1
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
We prove that the Ehrhart polynomial of a zonotope is a specialization of the multiplicity Tutte pol...
An integral coefficient matrix determines an integral arrangement of hyperplanes in Rm. After modulo...
Abstract. We consider projections of points onto fundamental chambers of finite real reflection grou...
. A hyperplane arrangement is said to satisfy the "Riemann hypothesis" if all roots of its...
AbstractA wealth of geometric and combinatorial properties of a given linear endomorphism X of RN is...
We study central hyperplane arrangements with integral coefficients modulo positive integers q. We p...
Abstract. We introduce certain lattice sums associated with hyperplane arrangements, which are (mult...
AbstractThe Minkowski sum of edges corresponding to the column vectors of a matrix A with real entri...
AbstractWe present a new combinatorial method to determine the characteristic polynomial of any subs...
Hyperplane arrangements form the geometric counterpart of combinatorial objects such as matroids. Th...
We study enumerative questions on the moduli space M(L) of hyperplane ar-rangements with a given int...
Let A be a Coxeter hyperplane arrangement, that is the arrangement of reflecting hyperplanes of an i...
AbstractA wealth of geometric and combinatorial properties of a given linear endomorphism X of RN is...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
We prove that the Ehrhart polynomial of a zonotope is a specialization of the multiplicity Tutte pol...
An integral coefficient matrix determines an integral arrangement of hyperplanes in Rm. After modulo...
Abstract. We consider projections of points onto fundamental chambers of finite real reflection grou...
. A hyperplane arrangement is said to satisfy the "Riemann hypothesis" if all roots of its...
AbstractA wealth of geometric and combinatorial properties of a given linear endomorphism X of RN is...
We study central hyperplane arrangements with integral coefficients modulo positive integers q. We p...
Abstract. We introduce certain lattice sums associated with hyperplane arrangements, which are (mult...
AbstractThe Minkowski sum of edges corresponding to the column vectors of a matrix A with real entri...
AbstractWe present a new combinatorial method to determine the characteristic polynomial of any subs...
Hyperplane arrangements form the geometric counterpart of combinatorial objects such as matroids. Th...
We study enumerative questions on the moduli space M(L) of hyperplane ar-rangements with a given int...
Let A be a Coxeter hyperplane arrangement, that is the arrangement of reflecting hyperplanes of an i...
AbstractA wealth of geometric and combinatorial properties of a given linear endomorphism X of RN is...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
We prove that the Ehrhart polynomial of a zonotope is a specialization of the multiplicity Tutte pol...
An integral coefficient matrix determines an integral arrangement of hyperplanes in Rm. After modulo...