Laplace One-Step Controller for Linear Scalar Systems

Jason L. Speyer, Jun Yoneyama, Nhattrieu Duong, Moshe Idan

Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

Abstract

Uncertainties in many physical systems have impulsive properties poorly modeled by Gaussian distributions. Building on work to develop Cauchy controllers, a Laplace controller is explored as a heavier-tailed alternative to the Gaussian. Whereas the Cauchy density has no moments, the Laplace density has finite moments of all orders as the Gaussian density.For a scalar discrete linear system with additive Laplace process and measurement noises, the one-step optimal control problem is considered, where the conditional expectation of the cost criterion is determined as a function of the measurements and the control in closed form. The optimal control is determined numerically for different values of noise parameters and cost criterion weightings, and its properties are examined.

Original languageEnglish
Title of host publication2018 European Control Conference, ECC 2018
Pages2703-2707
Number of pages5
ISBN (Electronic)9783952426982
DOIs
StatePublished - 27 Nov 2018
Event16th European Control Conference, ECC 2018 - Limassol, Cyprus
Duration: 12 Jun 201815 Jun 2018

Publication series

Name2018 European Control Conference, ECC 2018

Conference

Conference16th European Control Conference, ECC 2018
Country/TerritoryCyprus
CityLimassol
Period12/06/1815/06/18

All Science Journal Classification (ASJC) codes

  • Control and Systems Engineering
  • Control and Optimization

Fingerprint

Dive into the research topics of 'Laplace One-Step Controller for Linear Scalar Systems'. Together they form a unique fingerprint.

Cite this