Add to ORKGA spectral function on a formally real Jordan algebra is a real-valued function which depends only on the eigenvalues of its argument. One convenient way to create them is to start from a function f : Rexp.r [arrow] R which is symmetric in the components of its argument, and to define the function F(u) := f([delta](u)) where [delta](u) is the vector of eigenvalues of u. In this paper, we show that this construction preserves a number of properties which are frequently used in the framework of convex optimization: differentiability, convexity properties and Lipschitz continuity of the gradient for the Euclidean norm with the same constant as for f
A function, F, on the space of n × n real symmetric matrices is called spectral if it depends only o...
AbstractA function, F, on the space of n×n real symmetric matrices is called spectral if it depends ...
Abstract. Certain interesting classes of functions on a real inner product space are invari-ant unde...
A spectral function on a formally real Jordan algebra is a real-valued function which depends only o...
AbstractWe study in this paper several properties of the eigenvalues function of a Euclidean Jordan ...
AbstractWe study in this paper several properties of the eigenvalues function of a Euclidean Jordan ...
Successful methods for a large class of nonlinear convex optimization problems have recently been de...
We study analyticity, differentiability, and semismoothness of Löwner’s operator and spectral functi...
We study analyticity, differentiability, and semismoothness of Löwner’s operator and spectral funct...
We study analyticity, differentiability, and semismoothness of Löwner’s operator and spectral funct...
Abstract. There is growing interest in optimization problems with real symmetric matrices as variabl...
In this thesis we present a generalization of interior-point methods for linear optimization based o...
There is growing interest in optimization problems with real symmetric matrices as variables. Genera...
With every real valued function, of a real argument, can be associated a matrix function mapping a l...
For any function f from R to R, one can define a corresponding function on the space of n &times...
A function, F, on the space of n × n real symmetric matrices is called spectral if it depends only o...
AbstractA function, F, on the space of n×n real symmetric matrices is called spectral if it depends ...
Abstract. Certain interesting classes of functions on a real inner product space are invari-ant unde...
A spectral function on a formally real Jordan algebra is a real-valued function which depends only o...
AbstractWe study in this paper several properties of the eigenvalues function of a Euclidean Jordan ...
AbstractWe study in this paper several properties of the eigenvalues function of a Euclidean Jordan ...
Successful methods for a large class of nonlinear convex optimization problems have recently been de...
We study analyticity, differentiability, and semismoothness of Löwner’s operator and spectral functi...
We study analyticity, differentiability, and semismoothness of Löwner’s operator and spectral funct...
We study analyticity, differentiability, and semismoothness of Löwner’s operator and spectral funct...
Abstract. There is growing interest in optimization problems with real symmetric matrices as variabl...
In this thesis we present a generalization of interior-point methods for linear optimization based o...
There is growing interest in optimization problems with real symmetric matrices as variables. Genera...
With every real valued function, of a real argument, can be associated a matrix function mapping a l...
For any function f from R to R, one can define a corresponding function on the space of n &times...
A function, F, on the space of n × n real symmetric matrices is called spectral if it depends only o...
AbstractA function, F, on the space of n×n real symmetric matrices is called spectral if it depends ...
Abstract. Certain interesting classes of functions on a real inner product space are invari-ant unde...