论文信息 - A probabilistic local majority polling game on weighted directed graphs with an application to the distributed agreement problem

A probabilistic local majority polling game on weighted directed graphs with an application to the distributed agreement problem

In this paper, we investigate a probabilistic local majority polling game on weighted directed graphs, keeping an application to the distributed agreement problem in mind. We formulate the game as a Markov chain, where an absorbing state corresponds to a system configuration that an agreement is achieved, and characterize on which graphs the game will eventually reach an absorbing state with probability 1. We then calculate, given a pair of an initial and an absorbing states, the absorbing probability that the game will reach the absorbing state, starting with the Initial state. We finally demonstrate that regular graphs have a desirable property from the view of the distributed agreement application, by using the martingale theory.

Masafumi Yamashita | Toshio Nakata | Hiroshi Imahayashi

[1] Moshe Tennenholtz,et al. On the Synthesis of Useful Social Laws for Artificial Agent Societies (Preliminary Report) , 1992, AAAI.

[2] David Peleg,et al. Size Bounds for Dynamic Monopolies , 1998, Discret. Appl. Math..

[3] Michael E. Saks,et al. Sphere packing and local majorities in graphs , 1993, [1993] The 2nd Israel Symposium on Theory and Computing Systems.

[4] William Feller,et al. An Introduction to Probability Theory and Its Applications , 1951 .

[5] D. Peleg. Local Majority Voting, Small Coalitions and Controlling Monopolies in Graphs: A Review , 1996 .

[6] Ronald L. Rivest,et al. Introduction to Algorithms , 1990 .