Add to ORKGWe present results on smooth and nonsmooth variational properties of {it symmetric} functions of the eigenvalues of a real symmetric matrix argument, as well as {it absolutely symmetric} functions of the singular values of a real rectangular matrix. Such results underpin the theory of optimization problems involving such functions. We answer the question of when a symmetric function of the eigenvalues allows a quadratic expansion around a matrix, and then the stronger question of when it is twice differentiable. We develop simple formulae for the most important nonsmooth subdifferentials of functions depending on the singular values of a real rectangular matrix argument and give several examples. The analysis of the above two class...
There is growing interest in optimization problems with real symmetric matrices as variables. Genera...
Any spectral function can be written as a composition of a symmetric function $f: \rn \mapsto \Re$ a...
We give the review of recent results in relative perturbation theory for eigenvalue and singular val...
AbstractA function, F, on the space of n×n real symmetric matrices is called spectral if it depends ...
Abstract. Optimization problems involving the eigenvalues of symmetric and nonsymmetric matrices pre...
Author name used in this publication: Xiaoqi Yang2003-2004 > Academic research: refereed > Publicati...
AbstractWe study in this paper several properties of the eigenvalues function of a Euclidean Jordan ...
The computation of eigenvalues of a matrix is still of importance from both theoretical and practica...
AbstractThe similarity relations that are derived in this paper reduce to well-known results in the ...
A spectral function on a formally real Jordan algebra is a real-valued function which depends only o...
Abstract. There is growing interest in optimization problems with real symmetric matrices as variabl...
In this paper we extend the smoothing technique [7], [9] onto the problems of Semidefinite Optimizat...
Successful methods for a large class of nonlinear convex optimization problems have recently been de...
Abstract. In this work we continue the nonsmooth analysis of absolutely symmetric functions of the s...
AbstractFor a symmetric matrix B ∈ Rn × n and a vector a ∈ Rn, the maximal extended eigenvalue λ(a):...
There is growing interest in optimization problems with real symmetric matrices as variables. Genera...
Any spectral function can be written as a composition of a symmetric function $f: \rn \mapsto \Re$ a...
We give the review of recent results in relative perturbation theory for eigenvalue and singular val...
AbstractA function, F, on the space of n×n real symmetric matrices is called spectral if it depends ...
Abstract. Optimization problems involving the eigenvalues of symmetric and nonsymmetric matrices pre...
Author name used in this publication: Xiaoqi Yang2003-2004 > Academic research: refereed > Publicati...
AbstractWe study in this paper several properties of the eigenvalues function of a Euclidean Jordan ...
The computation of eigenvalues of a matrix is still of importance from both theoretical and practica...
AbstractThe similarity relations that are derived in this paper reduce to well-known results in the ...
A spectral function on a formally real Jordan algebra is a real-valued function which depends only o...
Abstract. There is growing interest in optimization problems with real symmetric matrices as variabl...
In this paper we extend the smoothing technique [7], [9] onto the problems of Semidefinite Optimizat...
Successful methods for a large class of nonlinear convex optimization problems have recently been de...
Abstract. In this work we continue the nonsmooth analysis of absolutely symmetric functions of the s...
AbstractFor a symmetric matrix B ∈ Rn × n and a vector a ∈ Rn, the maximal extended eigenvalue λ(a):...
There is growing interest in optimization problems with real symmetric matrices as variables. Genera...
Any spectral function can be written as a composition of a symmetric function $f: \rn \mapsto \Re$ a...
We give the review of recent results in relative perturbation theory for eigenvalue and singular val...