Abstract
In this paper, we present an improved subgradient algorithm for solving a general multi-agent convex optimization problem in a distributed way, where the agents are to jointly minimize a global objective function subject to a global inequality constraint, a global equality constraint and a global constraint set. The global objective function is a combination of local agent objective functions and the global constraint set is the intersection of each agent local constraint set. Our motivation comes from networking applications where dual and primal-dual subgradient methods have attracted much attention in the design of decentralized network protocols. Our main focus is on constrained problems where the local constraint sets are identical. Thus, we propose a distributed primal-dual subgradient algorithm, which is based on the description of the primal-dual optimal solutions as the saddle points of the penalty functions. We show that, the algorithm can be implemented over networks with changing topologies but satisfying a standard connectivity property, and allow the agents to asymptotically converge to optimal solution with optimal value of the optimization problem under the Slater’s condition.
Highlights
In recent years, distributed optimization and control have developed rapidly, and have been welcomed in the fields of industry and national defense, including smart grid, sensor network, social network and information system (CyberPhysical system)
The main focus is to solve a distributed optimization problem where the global objective function is composed of a sum of local objective functions, each of which is only known by one agent
We consider a general multi-agent optimization problem where the main focus is to minimize a global objective function which is a sum of local objective functions, subject to global constraints, including an inequality constraint, an equality constraint and a constraint set
Summary
In recent years, distributed optimization and control have developed rapidly, and have been welcomed in the fields of industry and national defense, including smart grid, sensor network, social network and information system (CyberPhysical system). Distributed optimization problems were first studied systematically in [1] where the union of the graphs was assumed to be strongly connected among each time interval of a certain bounded length and the adjacency matrices were doubly stochastic. In order to solved these constraints, the author in [14] presented two different distributed projection algorithms with three assumptions that the union of the graphs is assumed to be strongly connected among each time interval of a certain bounded length and the adjacency matrices were doubly stochastic and nondegeneracy. We consider a general multi-agent optimization problem where the main focus is to minimize a global objective function which is a sum of local objective functions, subject to global constraints, including an inequality constraint, an equality constraint and a (state) constraint set.
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