Add to ORKGIn this paper we study the notion of balanced complex polytope as a generalization of a symmetric real polytope to the complex space. We pay particular attention to the geometric properties of such complex polytopes and of their counterparts in the adjoint form. In particular, we stress the differences occurring with respect to the well-known real case. We also introduce and discuss the related definitions of complex polytope norm and adjoint complex polytope norm
AbstractA new definition of an h-vector for cubical polytopes (and complexes) is introduced. It has ...
We present a counterexample that solves, with a negative answer, an open problem in the theory of co...
AbstractIn this paper, we study stability properties of norms on the complex numbers and on the quat...
In this paper, we deepen the theoretical study of the geometric structure of a balanced complex poly...
The asymptotic behaviour of the solutions of a discrete linear dynamical system is related to the sp...
We generalize the property of complex numbers to be closely related to Euclidean circles by construc...
We disprove a recent conjecture of Guglielmi, Wirth, and Zennaro, stating that any nondefective set ...
AbstractWe study complex-valued symmetric matrices. A simple expression for the spectral norm of suc...
Let V be a real or complex finite-dimensional vector space, and let be a set of norms on V. The norm...
AbstractLet V be a real or complex finite-dimensional vector space, and let N be a set of norms on V...
In the vector balancing problem, we are given symmetric convex bodies C and K in ℝn, and our goal is...
Abstract. We disprove a recent conjecture of Guglielmi, Wirth, and Zennaro, stating that any nondefe...
In this note we study the problem how the complexication of a real Banach space can be normed in suc...
In this paper we consider finite families of complex n 7n-matrices. In particular, we focus on those...
AbstractA notion of uniform convexity is defined for quasi-normed (complex) spaces by replacing norm...
AbstractA new definition of an h-vector for cubical polytopes (and complexes) is introduced. It has ...
We present a counterexample that solves, with a negative answer, an open problem in the theory of co...
AbstractIn this paper, we study stability properties of norms on the complex numbers and on the quat...
In this paper, we deepen the theoretical study of the geometric structure of a balanced complex poly...
The asymptotic behaviour of the solutions of a discrete linear dynamical system is related to the sp...
We generalize the property of complex numbers to be closely related to Euclidean circles by construc...
We disprove a recent conjecture of Guglielmi, Wirth, and Zennaro, stating that any nondefective set ...
AbstractWe study complex-valued symmetric matrices. A simple expression for the spectral norm of suc...
Let V be a real or complex finite-dimensional vector space, and let be a set of norms on V. The norm...
AbstractLet V be a real or complex finite-dimensional vector space, and let N be a set of norms on V...
In the vector balancing problem, we are given symmetric convex bodies C and K in ℝn, and our goal is...
Abstract. We disprove a recent conjecture of Guglielmi, Wirth, and Zennaro, stating that any nondefe...
In this note we study the problem how the complexication of a real Banach space can be normed in suc...
In this paper we consider finite families of complex n 7n-matrices. In particular, we focus on those...
AbstractA notion of uniform convexity is defined for quasi-normed (complex) spaces by replacing norm...
AbstractA new definition of an h-vector for cubical polytopes (and complexes) is introduced. It has ...
We present a counterexample that solves, with a negative answer, an open problem in the theory of co...
AbstractIn this paper, we study stability properties of norms on the complex numbers and on the quat...