Riesz-Thorin theorem and lp-stability of nonlinear time-varying discrete systems

The bounded-input bounded-output stability, finite time stability and settling time of a single-loop feedback system consisting of a nonlinear time-var@ag gain followed by a linear time-invariant system are investigated via a nonlinear integral inequality. The gain has the form k, + k,(t) + k,(t) g(

## This paper studies discrete-time invariant autonomous systems We investigate the problem of when asymptotic stability of I: can be characterized by means of zero-state observability of 2 and square summability of the output function h(x,). The relationship among observability, square summable s

In a recent article on stability of discrete inclusions the authors argue that the problem of determining stability of discrete inclusions given by convex sets of matrices with a finite number of extremal points is NP-hard. It is shown that the argument that has been employed is inconclusive and thu

By using the theory of discrete-time passive systems and the concept of feedback equivalence, we present an approach toward deriving sufficient conditions for the global stabilization of discrete-time nonlinear systems in the form x(k + 1) =0x(k)) + g(x(k))u(k). The central feature of the approach

## Abstract The robust stability of discrete singular systems with time‐varying delay is considered. New delay‐dependent stability criteria are proposed, which are dependent on the minimum and maximum delay bounds. A strict delay‐dependent linear matrix inequality (LMI) condition is obtained for a