Anurita Dey scite author profile

This paper addresses the problem of global asymptotic stability of a class of discrete uncertain state-delayed systems described by the Fornasini-Marchesini second local state-space (FMSLSS) model using generalized overflow nonlinearities. The uncertainties are assumed to be norm bounded. A computationally tractable, that is, linear-matrix-inequality-(LMI-) based new criterion for the global asymptotic stability of such system is proposed. It is demonstrated that several previously reported stability criteria for two-dimensional (2D) systems are recovered from the presented approach as special cases. Numerical examples are given to illustrate the usefulness of the presented approach.

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Stability of 2-D digital filters described by the Roesser model using any combination of quantization and overflow nonlinearities

Kokil

Dey

Kar

2012

Signal Processing

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Anurita Dey

LMI-based criterion for robust stability of 2-D discrete systems with interval time-varying delays employing quantisation / overflow nonlinearities

Stability of two-dimensional digital filters described by the Fornasini–Marchesini second model with quantisation and overflow

Robust stability of 2-D discrete systems employing generalized overflow nonlinearities: An LMI approach

LMI‐Based Criterion for the Robust Stability of 2D Discrete State‐Delayed Systems Using Generalized Overflow Nonlinearities

Stability of 2-D digital filters described by the Roesser model using any combination of quantization and overflow nonlinearities

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