Title :
Neuristor waveforms and stability by the linear approximation
Abstract :
A generalization of the direct method of Lyapunov is employed to determine the stability of neuristor waveforms. The validity of the linear approximation for distributed systems is discussed. It is shown that a neuristor waveform on a RC ± G transmission line is stable if its derivative represents the minimum eigenvalue solution of the linearized perturbation equation.
Keywords :
Boundary conditions; Differential equations; Linear approximation; Nonlinear dynamical systems; Nonlinear equations; Partial differential equations; Stability criteria; Taylor series; Transmission lines; Voltage;
Journal_Title :
Proceedings of the IEEE
DOI :
10.1109/PROC.1968.6611
