Linear Convergence Rate of a Class of Distributed Augmented Lagrangian Algorithms

Author

Jakovetic, Dusan ; Moura, Jose M. F. ; Xavier, Joao

Author_Institution

BioSense Center, Univ. of Novi Sad, Novi Sad, Serbia

Volume

60

Issue

4

fYear

2015

fDate

Apr-15

Firstpage

922

Lastpage

936

Abstract

We study distributed optimization where nodes cooperatively minimize the sum of their individual, locally known, convex costs f_i(x)´s; x ϵ ℝ^d is global. Distributed augmented Lagrangian (AL) methods have good empirical performance on several signal processing and learning applications, but there is limited understanding of their convergence rates and how it depends on the underlying network. This paper establishes globally linear (geometric) convergence rates of a class of deterministic and randomized distributed AL methods, when the f_i´s are twice continuously differentiable and have a bounded Hessian. We give explicit dependence of the convergence rates on the underlying network parameters. Simulations illustrate our analytical findings.

Keywords

Hessian matrices; deterministic algorithms; distributed algorithms; randomised algorithms; bounded Hessian; convex costs; deterministic distributed AL methods; distributed augmented Lagrangian algorithms; distributed optimization; geometric convergence rates; globally linear convergence rates; learning applications; linear convergence rate; randomized distributed AL methods; signal processing; Clocks; Convergence; Cost function; Iterative methods; Jacobian matrices; Symmetric matrices; Augmented Lagrangian; Distributed optimization; augmented Lagrangian; consensus; convergence rate; distributed optimization;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.2014.2363299

Filename

6926737