Carnegie Mellon University
Browse

A Fast Algorithm for Sparse Controller Design

Download (374.15 kB)
journal contribution
posted on 2002-07-01, 00:00 authored by Matt Wytock, J. Zico Kolter

We consider the task of designing sparse control laws for large-scale systems by directly minimizing an infinite horizon quadratic cost with an ℓ1 penalty on the feedback controller gains. Our focus is on an improved algorithm that allows us to scale to large systems (i.e. those where sparsity is most useful) with convergence times that are several orders of magnitude faster than existing algorithms. In particular, we develop an efficient proximal Newton method which minimizes per-iteration cost with a coordinate descent active set approach and fast numerical solutions to the Lyapunov equations. Experimentally we demonstrate the appeal of this approach on synthetic examples and real power networks significantly larger than those previously considered in the literature.

History

Date

2002-07-01

Usage metrics

    Exports

    RefWorks
    BibTeX
    Ref. manager
    Endnote
    DataCite
    NLM
    DC