The authors demonstrate some proofs of zero-input overflow-oscillation suppression in recursive digital filters. The proofs are based on the second method of Lyapunov. For second-order digital filters with complex conjugated poles, the state describes a trajectory in the phase plane, spiraling toward the origin, as long as no overflow correction is applied. Following this state signal, an energy function that is a natural candidate for a Lyapunov function can be defined. For the second-order direct-form digital filter with a saturation characteristic, this energy function is a Lyapunov function. However, it is not the only possible Lyapunov function of this filter. All energy functions with an energy matrix that is diagonally dominant guara...
We consider an abstract class of infinite-dimensional dynamical systems with inputs. For this class ...
<p>Noise-induced stabilization occurs when an unstable deterministic system is stabilized by the add...
AbstractIf B(z) is an absolutely convergent power series on the unit disk, the requirements for the ...
The authors demonstrate some proofs of zero-input overflow-oscillation suppression in recursive digi...
A set of conditions is derived that ensures overflow stability of second-order digital filters for d...
In the present paper, the Second Method of Lyapunov is utilized to establish sufficient conditions f...
We demonstrate the applicability of the constructive stability algorithm of Brayton and Tong in the ...
In a companion paper [4], we utilize the constructive stability algorithm of Brayton and Tong in the...
In this note we consider stability analysis of discrete-time discontinuous systems using Lyapunov fu...
Purpose - The purpose of this paper is to present a criterion for global asymptotic stability of sta...
Adaptive filtering has gained popularity in numerous applications to help cope with time-variations ...
This paper is concerned with the stability analysis of fixed-point state-space digital filters with ...
Lower bounds for the stability margins of 2-D digital systems are extended to n-D systems. These bou...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
We demonstrate the applicability of the constructive stability algorithm of Brayton and Tong to the ...
We consider an abstract class of infinite-dimensional dynamical systems with inputs. For this class ...
<p>Noise-induced stabilization occurs when an unstable deterministic system is stabilized by the add...
AbstractIf B(z) is an absolutely convergent power series on the unit disk, the requirements for the ...
The authors demonstrate some proofs of zero-input overflow-oscillation suppression in recursive digi...
A set of conditions is derived that ensures overflow stability of second-order digital filters for d...
In the present paper, the Second Method of Lyapunov is utilized to establish sufficient conditions f...
We demonstrate the applicability of the constructive stability algorithm of Brayton and Tong in the ...
In a companion paper [4], we utilize the constructive stability algorithm of Brayton and Tong in the...
In this note we consider stability analysis of discrete-time discontinuous systems using Lyapunov fu...
Purpose - The purpose of this paper is to present a criterion for global asymptotic stability of sta...
Adaptive filtering has gained popularity in numerous applications to help cope with time-variations ...
This paper is concerned with the stability analysis of fixed-point state-space digital filters with ...
Lower bounds for the stability margins of 2-D digital systems are extended to n-D systems. These bou...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
We demonstrate the applicability of the constructive stability algorithm of Brayton and Tong to the ...
We consider an abstract class of infinite-dimensional dynamical systems with inputs. For this class ...
<p>Noise-induced stabilization occurs when an unstable deterministic system is stabilized by the add...
AbstractIf B(z) is an absolutely convergent power series on the unit disk, the requirements for the ...