On the computation of the infimum in H∞-optimization

In this paper we prove some known and new inequalities using an elementary inequality and some basic facts from differential calculus.

To avoid difficulties associated with the computation of optimal singular/bang-bang controls, a common approach is to add a perturbed energy term. The efficacy of this perturbation method is assessed here via a direct search iterative dynamic programming procedure. A potential limitation of the stra

## Abstract Output from computer simulation experiments is often approximated as realizations of correlated random fields. Consequently, the corresponding optimal design questions must cope with the existence and detection of an error correlation structure, issues largely unaccounted for by traditi

We use free probability techniques to compute borders of spectra of nonhermitian operators in finite von Neumann algebras which arise as ``free sums'' of ``simple'' operators. To this end, the resolvent is analyzed with the aid of the Haagerup inequality. Concrete examples coming from reduced C\*-al