TY - JOUR
T1 - Randomized optimal consensus of multi-agent systems
AU - Shi, Guodong
AU - Johansson, Karl Henrik
PY - 2012/12
Y1 - 2012/12
N2 - In this paper, we formulate and solve a randomized optimal consensus problem for multi-agent systems with stochastically time-varying interconnection topology. The considered multi-agent system with a simple randomized iterating rule achieves an almost sure consensus meanwhile solving the optimization problem minz∈Rd∑i=1nfi(z), in which the optimal solution set of objective function fi can only be observed by agent i itself. At each time step, simply determined by a Bernoulli trial, each agent independently and randomly chooses either taking an average among its neighbor set, or projecting onto the optimal solution set of its own optimization component. Both directed and bidirectional communication graphs are studied. Connectivity conditions are proposed to guarantee an optimal consensus almost surely with proper convexity and intersection assumptions. The convergence analysis is carried out using convex analysis. We compare the randomized algorithm with the deterministic one via a numerical example. The results illustrate that a group of autonomous agents can reach an optimal opinion by each node simply making a randomized trade-off between following its neighbors or sticking to its own opinion at each time step.
AB - In this paper, we formulate and solve a randomized optimal consensus problem for multi-agent systems with stochastically time-varying interconnection topology. The considered multi-agent system with a simple randomized iterating rule achieves an almost sure consensus meanwhile solving the optimization problem minz∈Rd∑i=1nfi(z), in which the optimal solution set of objective function fi can only be observed by agent i itself. At each time step, simply determined by a Bernoulli trial, each agent independently and randomly chooses either taking an average among its neighbor set, or projecting onto the optimal solution set of its own optimization component. Both directed and bidirectional communication graphs are studied. Connectivity conditions are proposed to guarantee an optimal consensus almost surely with proper convexity and intersection assumptions. The convergence analysis is carried out using convex analysis. We compare the randomized algorithm with the deterministic one via a numerical example. The results illustrate that a group of autonomous agents can reach an optimal opinion by each node simply making a randomized trade-off between following its neighbors or sticking to its own opinion at each time step.
KW - Distributed optimization
KW - Multi-agent systems
KW - Optimal consensus
KW - Randomized algorithms
KW - Set convergence
UR - http://www.scopus.com/inward/record.url?scp=84869509269&partnerID=8YFLogxK
U2 - 10.1016/j.automatica.2012.08.018
DO - 10.1016/j.automatica.2012.08.018
M3 - Article
SN - 0005-1098
VL - 48
SP - 3018
EP - 3030
JO - Automatica
JF - Automatica
IS - 12
ER -