|
Abstract:
This paper addresses the stability and performance of discretized adaptive control algorithms for robotic manipulator control, and the compensation of these algorithms for improved stability and tracing performance. The discretion of Slotine and Li's direct adaptive control algorithm results in a sampled-data system for which stability has not been guaranteed. By formulating the entire sampled-data system in continuous-time, Lyapunov's direct method is used to determine the stability and to derive a non-linear discrete-time compensating term. This compensator is added to a multi-rate discretization of slotine and Li's adaptive algorithm, to stabilize the sampled-data system. For sufficiently high gain, globally stable performance and a known bound on the norm of the filtered error is proven. The stabilizing effect of the compensator and validity of the error bound predictions are demonstrated through simulation and implementation of 2 degree-of-freedom manipulator control
|
