We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in the modelling of non-passive systems. The linear space of quasi-Herglotz functions constitutes a natural extension of the convex cone of Herglotz functions. It consists of differences of Herglotz functions and we show that several of the important properties and modelling perspectives are inherited by the new set of quasi-Herglotz functions. In particular, this applies to their integral representations, the associated integral identities or sum rules (with adequate additional assumptions), their boundary values on the real axis and the associated approximation theory. Numerical examples are included to demonstrate the modelling of a non-passive...
We study partial C^{1,alpha}-regularity of minimizers of quasi--convex variational integrals with no...
The well-known perturbational duality theory for convex optimization is refined to handle directly, ...
The response of many passive linear physical systems are governed by Herglotz or Stieltjes functions...
We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in th...
The set of quasi-Herglotz functions is introduced as a natural extension of the convex cone of Hergl...
A passive approximation problem is formulated where the target function is an arbitrary complex-valu...
A passive approximation problem is formulated where the target function is an arbitrary complex valu...
Physical bounds in electromagnetic field theory have been of interest for more than a decade. Consid...
In this overview talk will deal with generalizations of Herglotz-Nevanlinna functions . We will star...
In this paper, the class of (complex) quasi-Herglotz functions is introduced as the complex vector s...
textabstractIn the first chapter of this book the basic results within convex and quasiconvex analys...
The possibility of representing the epigraph of a nite-valued convex function by means of a (locally...
Herglotz functions inevitably appear in pure mathematics, mathematical physics, and engineering with...
In this thesis, we investigate different aspects of the class of Herglotz-Nevanlinna functions in se...
AbstractWe introduce two classes of discrete quasiconvex functions, called quasi M- and L-convex fun...
We study partial C^{1,alpha}-regularity of minimizers of quasi--convex variational integrals with no...
The well-known perturbational duality theory for convex optimization is refined to handle directly, ...
The response of many passive linear physical systems are governed by Herglotz or Stieltjes functions...
We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in th...
The set of quasi-Herglotz functions is introduced as a natural extension of the convex cone of Hergl...
A passive approximation problem is formulated where the target function is an arbitrary complex-valu...
A passive approximation problem is formulated where the target function is an arbitrary complex valu...
Physical bounds in electromagnetic field theory have been of interest for more than a decade. Consid...
In this overview talk will deal with generalizations of Herglotz-Nevanlinna functions . We will star...
In this paper, the class of (complex) quasi-Herglotz functions is introduced as the complex vector s...
textabstractIn the first chapter of this book the basic results within convex and quasiconvex analys...
The possibility of representing the epigraph of a nite-valued convex function by means of a (locally...
Herglotz functions inevitably appear in pure mathematics, mathematical physics, and engineering with...
In this thesis, we investigate different aspects of the class of Herglotz-Nevanlinna functions in se...
AbstractWe introduce two classes of discrete quasiconvex functions, called quasi M- and L-convex fun...
We study partial C^{1,alpha}-regularity of minimizers of quasi--convex variational integrals with no...
The well-known perturbational duality theory for convex optimization is refined to handle directly, ...
The response of many passive linear physical systems are governed by Herglotz or Stieltjes functions...