Add to ORKGOne of the motivations to state HRT conjecture on the linear independence of finite Gabor systems was the fact that there are linearly dependent Finite Wavelet Systems (FWS). Meanwhile, there are also many examples of linearly independent FWS, some of which are presented in this paper. We prove the linear independence of every three point FWS generated by a nonzero Schwartz function and with any number of points if the FWS is generated by a nonzero Schwartz function, for which the absolute value of the Fourier transform is decreasing at infinity. We also prove the linear independence of any FWS generated by a nonzero square integrable function, for which the Fourier transform has certain behavior at infinity. Such a function can be any squa...
AbstractThe convex polytope of all stochastic and symmetric matrices is considered and its extreme p...
In this thesis we first develop a geometric framework for spectral pairs and for orthonormal familie...
Let Ωn be the set all of n × n doubly stochastic matrices. It is well-known that Ωn is a polytope wh...
One of the motivations to state HRT conjecture on the linear independence of finite Gabor systems wa...
We consider the convex set Γm,n of m×n stochastic matrices and the convex set Γπm,n ⊂Γm,n of m×n cen...
We investigate convex polytopes of doubly stochastic matrices having special structures: symmetric, ...
AbstractDoubly stochastic matrices are defined which have entries from an arbitrary vector space V. ...
AbstractA study is made of the extreme points of the convex set of doubly stochastic completely posi...
Gabor and Wavelet Systems are some of the most important families of integrable functions with great...
AbstractWe characterize the extreme points of the polytope of symmetric doubly stochastic matrices o...
AbstractDoubly stochastic matrices are defined which have entries from an arbitrary vector space V. ...
AbstractLet Kn denote the closed convex set of all n-by-n positive semidefinite doubly stochastic ma...
AbstractSeveral properties of the extreme points of the convex set of three dimensional line stochas...
AbstractIn the present paper we introduce a notion of G-decompositions of matrices. Main result of t...
AbstractEach extreme point in the convex set Δ∗n of all n×n symmetric doubly-stochastic matrices is ...
AbstractThe convex polytope of all stochastic and symmetric matrices is considered and its extreme p...
In this thesis we first develop a geometric framework for spectral pairs and for orthonormal familie...
Let Ωn be the set all of n × n doubly stochastic matrices. It is well-known that Ωn is a polytope wh...
One of the motivations to state HRT conjecture on the linear independence of finite Gabor systems wa...
We consider the convex set Γm,n of m×n stochastic matrices and the convex set Γπm,n ⊂Γm,n of m×n cen...
We investigate convex polytopes of doubly stochastic matrices having special structures: symmetric, ...
AbstractDoubly stochastic matrices are defined which have entries from an arbitrary vector space V. ...
AbstractA study is made of the extreme points of the convex set of doubly stochastic completely posi...
Gabor and Wavelet Systems are some of the most important families of integrable functions with great...
AbstractWe characterize the extreme points of the polytope of symmetric doubly stochastic matrices o...
AbstractDoubly stochastic matrices are defined which have entries from an arbitrary vector space V. ...
AbstractLet Kn denote the closed convex set of all n-by-n positive semidefinite doubly stochastic ma...
AbstractSeveral properties of the extreme points of the convex set of three dimensional line stochas...
AbstractIn the present paper we introduce a notion of G-decompositions of matrices. Main result of t...
AbstractEach extreme point in the convex set Δ∗n of all n×n symmetric doubly-stochastic matrices is ...
AbstractThe convex polytope of all stochastic and symmetric matrices is considered and its extreme p...
In this thesis we first develop a geometric framework for spectral pairs and for orthonormal familie...
Let Ωn be the set all of n × n doubly stochastic matrices. It is well-known that Ωn is a polytope wh...