In this paper the concept of block diagonal dominance is used to generalize Rosenbrock's Nyquist array stability theorem, and extend a number of recently developed robust stability results to interconnected systems. These results allow a feedback design problem involving a large number of loops to be decomposed into a number of problems of lower dimension.link_to_subscribed_fulltex
The Nyquist criterion for feedback stability is reformulated in a very simple fashion. Using the mot...
Classical dissipativity and small-gain theory provide computationally tractable, but conservative me...
In this paper, two interconnected structures are first discussed, under which some closed-loop subsy...
In this paper the concept of block diagonal dominance is used to generalize Rosenbrock's Nyquist arr...
The concept of generalized block diagonal dominance is used to extend a number of recently developed...
The concept of generalized block diagonal dominance is used to derive robust stability results for a...
The concept of generalized block diagonal dominance is used to derive robust stability results for a...
Diagonal dominance plays a fundamental role in the design of multi-variable feedback control systems...
We study a class of matrices with a rank-1 interconnection structure, and derive a simple necessary ...
This paper provides sufficient conditions for robust stability of a multivariable interval feedback ...
Block Relative Gain (BRG) is a useful method for finding suitable pairings for block decentralized c...
In this paper, we use classical Nyquist arguments to derive stability results for large-scale interc...
In this paper, we derive stability results for large-scale interconnections of "mixed" linear, time-...
AbstractThe main objective of this paper is to formulate a generalization of block diagonal dominanc...
For a class of monotone operators T on the positive orthant of n-dimensional Euclidean space we intr...
The Nyquist criterion for feedback stability is reformulated in a very simple fashion. Using the mot...
Classical dissipativity and small-gain theory provide computationally tractable, but conservative me...
In this paper, two interconnected structures are first discussed, under which some closed-loop subsy...
In this paper the concept of block diagonal dominance is used to generalize Rosenbrock's Nyquist arr...
The concept of generalized block diagonal dominance is used to extend a number of recently developed...
The concept of generalized block diagonal dominance is used to derive robust stability results for a...
The concept of generalized block diagonal dominance is used to derive robust stability results for a...
Diagonal dominance plays a fundamental role in the design of multi-variable feedback control systems...
We study a class of matrices with a rank-1 interconnection structure, and derive a simple necessary ...
This paper provides sufficient conditions for robust stability of a multivariable interval feedback ...
Block Relative Gain (BRG) is a useful method for finding suitable pairings for block decentralized c...
In this paper, we use classical Nyquist arguments to derive stability results for large-scale interc...
In this paper, we derive stability results for large-scale interconnections of "mixed" linear, time-...
AbstractThe main objective of this paper is to formulate a generalization of block diagonal dominanc...
For a class of monotone operators T on the positive orthant of n-dimensional Euclidean space we intr...
The Nyquist criterion for feedback stability is reformulated in a very simple fashion. Using the mot...
Classical dissipativity and small-gain theory provide computationally tractable, but conservative me...
In this paper, two interconnected structures are first discussed, under which some closed-loop subsy...