An improved criterion for the global asymptotic stability of fixed-point state-space digital filters with saturation arithmetic

A criterion for the global asymptotic stability of fixed-point state-space digital filters with saturation arithmetic is presented. The criterion makes use of the structural properties of the multiple saturation nonlinearities in greater detail than several existing criteria. The relationship between the presented criterion and some existing ones is established. Through the relationship, it is clear that the presented criterion is less conservative than corresponding existing results, which is confirmed by a numerical example.

[1]  Vimal Singh,et al.  Stability analysis of 2-D state-space digital filters with overflow nonlinearities , 2000 .

[2]  Haranath Kar A new sufficient condition for the global asymptotic stability of 2-D state-space digital filters with saturation arithmetic , 2008, Signal Process..

[3]  Vimal Singh A new realizability condition for limit cycle-free state-space digital filters employing saturation arithmetic , 1985 .

[4]  Haranath Kar A novel criterion for the global asymptotic stability of 2-D discrete systems described by Roesser model using saturation arithmetic , 2010, Digit. Signal Process..

[5]  Vimal Singh,et al.  A new criterion for the overflow stability of second-order state-space digital filters using saturation arithmetic , 1998 .

[6]  Tao Shen,et al.  An improved stability criterion for fixed-point state-space digital filters using two's complement arithmetic , 2012, Autom..

[7]  Vimal Singh Elimination of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic: An LMI approach , 2006, Digit. Signal Process..

[8]  Vimal Singh Elimination of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic , 1990 .

[9]  A. Michel,et al.  Dynamical Systems with Saturation Nonlinearities: Analysis and Design , 1994 .

[10]  Tatsushi Ooba,et al.  Stability of linear discrete dynamics employing state saturation arithmetic , 2003, IEEE Trans. Autom. Control..

[11]  Vimal Singh Stability of discrete-time systems joined with a saturation operator on the state-space: Generalized form of Liu-Michel's criterion , 2011, Autom..

[12]  A. Michel,et al.  Asymptotic stability of discrete-time systems with saturation nonlinearities with applications to digital filters , 1992 .

[13]  T. Bose,et al.  Overflow oscillations in state-space digital filters , 1991 .

[14]  Haranath Kar Comment on "Elimination of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic: An LMI approach" by V. Singh [Digital Signal Process. 16(2006) 45-51] , 2010, Digit. Signal Process..

[15]  Haranath Kar An LMI based criterion for the nonexistence of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic , 2007, Digit. Signal Process..

[16]  R. Roesser A discrete state-space model for linear image processing , 1975 .

[17]  T. Claasen,et al.  Effects of quantization and overflow in recursive digital filters , 1976 .

[18]  J.H.F. Ritzerfeld A condition for the overflow stability of second-order digital filters that is satisfied by all scaled state-space structures using saturation , 1989 .

[19]  A. Michel,et al.  Dynamical systems with saturation nonlinearities , 1994 .

[20]  Haranath Kar An improved version of modified Liu-Michel's criterion for global asymptotic stability of fixed-point state-space digital filters using saturation arithmetic , 2010, Digit. Signal Process..

[21]  Vimal Singh Modified Form of Liu-Michel's Criterion for Global Asymptotic Stability of Fixed-Point State-Space Digital Filters Using Saturation Arithmetic , 2006, IEEE Transactions on Circuits and Systems II: Express Briefs.