Random-phase approximation for systems with singular interactions

## Abstract In this paper, model reduction problem for singular systems will be investigated. To solve the problem, the covariance for singular systems will be defined. Then, a model reduction method based on covariance approximation will be presented for obtaining a stable and impulse controllable

An algorithm for calculating excitation energies and transition moments in the randomphase approximation (RPA) of the polarization propagator is presented. The algorithm includes direct solution of the RPA eigenvalue problem and direct evaluation of products of superoperator Hamiltonian matrices wit

The random-phase approximation is tested for the first two transport cross sections with several L potential functtons. Fairly good results are obtained. and the approximation is recommended for exploratory calculations, eince it requires very little computational effort.

## Abstract This paper considers the class of continuous‐time singular linear Markovian jump systems with totally and partially known transition jump rates. The guaranteed cost control problem of this class of systems is tackled. New sufficient conditions for optimal guaranteed cost are developed.

## Abstract We give a spectral and dynamical description of certain models of random Schrödinger operators on __L__^2^(ℝ^__d__^) for which a modified version of the fractional moment method of Aizenman and Molchanov [3] can be applied. One family of models includes Schrödinger operators with random