Title :
Distributed solution for a Maximum Variance Unfolding Problem with sensor and robotic network applications
Author :
Simonetto, Andrea ; Keviczky, Tamas ; Dimarogonas, Dimos V.
Author_Institution :
Delft Center for Syst. & Control, Delft Univ. of Technol., Delft, Netherlands
Abstract :
We focus on a particular non-convex networked optimization problem, known as the Maximum Variance Unfolding problem and its dual, the Fastest Mixing Markov Process problem. These problems are of relevance for sensor networks and robotic applications. We propose to solve both these problems with the same distributed primal-dual subgradient iterations whose convergence is proven even in the case of approximation errors in the calculation of the subgradients. Furthermore, we illustrate the use of the algorithm for sensor network applications, such as localization problems, and for mobile robotic networks applications, such as dispersion problems.
Keywords :
Markov processes; approximation theory; concave programming; convergence; distributed sensors; iterative methods; mobile robots; sensors; approximation errors; dispersion problems; distributed primal-dual subgradient iterations; distributed solution; fastest mixing Markov process problem; localization problems; maximum variance unfolding problem; mobile robotic network applications; nonconvex networked optimization problem; sensor network applications; Decision support systems; Markov processes; Mercury (metals); Optimized production technology; Robot sensing systems;
Conference_Titel :
Communication, Control, and Computing (Allerton), 2012 50th Annual Allerton Conference on
Conference_Location :
Monticello, IL
Print_ISBN :
978-1-4673-4537-8
DOI :
10.1109/Allerton.2012.6483200
