Title :
Jointly Optimal LQG Quantization and Control Policies for Multi-Dimensional Systems
Author_Institution :
Dept. of Math. & Stat., Queen´s Univ., Kingston, ON, Canada
Abstract :
For controlled Rn-valued linear systems driven by Gaussian noise under quadratic cost criteria, we investigate the existence and the structure of optimal quantization and control policies. For fully observed and partially observed systems, we establish the global optimality of a class of predictive encoders and show that an optimal quantization policy exists, provided that the quantizers allowed are ones which have convex codecells. Furthermore, optimal control policies are linear in the conditional estimate of the state, and a form of separation of estimation and control holds.
Keywords :
Gaussian noise; control system synthesis; linear quadratic Gaussian control; linear systems; Gaussian noise; conditional state estimation; control policy; controlled Rn-valued linear systems; convex codecells; fully observed systems; jointly optimal LQG quantization policy; linear quadratic Gaussian quantization; multi-dimensional systems; partially observed systems; predictive encoders; quadratic cost criteria; Aerospace electronics; Encoding; Estimation; Markov processes; Optimal control; Quantization (signal); Receivers; Networked control systems; quantization; stochastic systems;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2013.2293414
