论文信息 - Diagonal stability of a class of cyclic systems and its connection with the secant criterion

Diagonal stability of a class of cyclic systems and its connection with the secant criterion

We consider a class of systems with a cyclic interconnection structure that arises, among other examples, in dynamic models for certain biochemical reactions. We first show that a ''secant'' criterion for local stability, derived earlier in the literature, is in fact a necessary and sufficient condition for diagonal stability of the corresponding class of matrices. We then revisit a recent generalization of this criterion to output strictly passive systems, and recover the same stability condition using our diagonal stability result as a tool for constructing a Lyapunov function. Using this procedure for Lyapunov construction we exhibit classes of cyclic systems with sector nonlinearities and characterize their global stability properties.

Eduardo D. Sontag | Murat Arcak | Eduardo Sontag | M. Arcak

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