Bifurcation and chaos in a system with a variable structure

A mathematical model of a variable-structure system based on a second-order nonself-oscillation equation is considered. Chaotic self-oscillations are formed when a chaotization algorithm is applied to the system. A block diagram of the dynamic system with a variable structure and the results of numerical analysis of this system are presented. It is demonstrated that chaos is possible in systems with a variable structure that are based on the equations of both nonlinear and conventional (linear) oscillatory circuits.