Nonnegativity, stability, and regularization of discrete-time descriptor systems

This paper addresses the existence and uniqueness of a solution and stability for Lipschitz discrete-time descriptor systems. By means of the fixed point principle, a criterion is presented via a matrix inequality, and the criterion guarantees the existence and uniqueness of a solution. In addition,

## Abstract A theorem by Hadamard gives a two‐part condition under which a map from one Banach space to another is a homeomorphism. The theorem, while often very useful, is incomplete in the sense that it does not explicitly specify the family of maps for which the condition is met. Recently, under

## ARSTRACIY Theorems are stated and proved fhat provide necessuty and sufficient conditions for practical stability of discrete-time systems. The first part of the paper deals with stability and instability with respect to time-uarying sets, whereas the second part is devoted to the study of fina

In this paper suboptimality bounds and stability of nonlinear discrete-time in"nite-horizon controllers are investigated. The nominal plant is supposed to be controlled by means of a feedback control law which is optimal with respect to some given criterion. The use of the Taylor}Maclaurin formula a