Bifurcation diagrams for feedback families of linear systems

A dynamical system can be represented by x ex fuY y gxY where A is a square matrix and B, C are rectangular matrices. The question of uncertain parameters e in the entries of the matrices A, B, C is particularly important when using the Kronecker form of the triple of matrices eY fY g: the eigens

The topological type function for stationary probability density of stable stochastic dynamical systems is introduced. The corresponding bifurcation diagrams in the case of one dichotomic noise are derived. Examples encountered in physics and chemistry are given.

In this paper, the notion of near insensitivity with respect to disturbance and parameter variations is introduced as a performance measure for linear feedback systems and conditions for near insensitivity are derived. It is shown that near insensitivity is attainable with high gain feedback provide

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