In this paper, we deepen the theoretical study of the geometric structure of a balanced complex polytope (b.c.p.), which is the generalization of a real centrally symmetric polytope to the complex space. We also propose a constructive algorithm for the representation of its facets in terms of their associated linear functionals. The b.c.p.s are used, for example, as a tool for the computation of the joint spectral radius of families of matrices. For the representation of real polytopes, there exist wellknown algorithms such as, for example, the Beneath\u2013Beyond method. Our purpose is to modify and adapt this method to the complex case by exploiting the geometric features of the b.c.p. However, due to the significant increase in the diffi...
AbstractA new definition of an h-vector for cubical polytopes (and complexes) is introduced. It has ...
In the vector balancing problem, we are given symmetric convex bodies C and K in ℝn, and our goal is...
In this paper we consider finite families of complex n 7n-matrices. In particular, we focus on those...
In this paper we study the notion of balanced complex polytope as a generalization of a symmetric re...
The asymptotic behaviour of the solutions of a discrete linear dynamical system is related to the sp...
AbstractIn this paper the problem of the computation of the joint spectral radius of a finite set of...
In this paper the problem of the computation of the joint spectral radius of a finite set of matrice...
Introduction We present a locality-based algorithm to solve the problem of splitting a complex of c...
Simplicial complexes are mathematical objects whose importance stretches from topology to commutativ...
This book presents a course in the geometry of convex polytopes in arbitrary dimension, suitable for...
The aim of this paper is to present a unified treatment of diagram techniques, particularly as appli...
Recent advances on the polyhedral combinatorics of the Balanced Minimum Evolution Problem (BMEP) ena...
Abstract. We give an explicit construction, based on Hadamard matrices, for an innite series of
AbstractEach group G of permutation matrices gives rise to a permutation polytope P(G) = conv(G) ⊂ R...
We generalize the property of complex numbers to be closely related to Euclidean circles by construc...
AbstractA new definition of an h-vector for cubical polytopes (and complexes) is introduced. It has ...
In the vector balancing problem, we are given symmetric convex bodies C and K in ℝn, and our goal is...
In this paper we consider finite families of complex n 7n-matrices. In particular, we focus on those...
In this paper we study the notion of balanced complex polytope as a generalization of a symmetric re...
The asymptotic behaviour of the solutions of a discrete linear dynamical system is related to the sp...
AbstractIn this paper the problem of the computation of the joint spectral radius of a finite set of...
In this paper the problem of the computation of the joint spectral radius of a finite set of matrice...
Introduction We present a locality-based algorithm to solve the problem of splitting a complex of c...
Simplicial complexes are mathematical objects whose importance stretches from topology to commutativ...
This book presents a course in the geometry of convex polytopes in arbitrary dimension, suitable for...
The aim of this paper is to present a unified treatment of diagram techniques, particularly as appli...
Recent advances on the polyhedral combinatorics of the Balanced Minimum Evolution Problem (BMEP) ena...
Abstract. We give an explicit construction, based on Hadamard matrices, for an innite series of
AbstractEach group G of permutation matrices gives rise to a permutation polytope P(G) = conv(G) ⊂ R...
We generalize the property of complex numbers to be closely related to Euclidean circles by construc...
AbstractA new definition of an h-vector for cubical polytopes (and complexes) is introduced. It has ...
In the vector balancing problem, we are given symmetric convex bodies C and K in ℝn, and our goal is...
In this paper we consider finite families of complex n 7n-matrices. In particular, we focus on those...