瓶颈拥塞博弈中纯纳什均衡与强均衡的计算

Computing pure Nash and strong equilibria in bottleneck congestion games

Mathematical Programming · 2012
被引 27
ABS 4

中文导读

研究了瓶颈拥塞博弈中纯纳什均衡和强均衡的计算复杂度,提出了多项式时间的集中式算法,并分析了自然改进动态的收敛性。

Abstract

Bottleneck congestion games properly model the properties of many real-world network routing applications. They are known to possess strong equilibria—a strengthening of Nash equilibrium to resilience against coalitional deviations. In this paper, we study the computational complexity of pure Nash and strong equilibria in these games. We provide a generic centralized algorithm to compute strong equilibria, which has polynomial running time for many interesting classes of games such as, e.g., matroid or single-commodity bottleneck congestion games. In addition, we examine the more demanding goal to reach equilibria in polynomial time using natural improvement dynamics. Using unilateral improvement dynamics in matroid games pure Nash equilibria can be reached efficiently. In contrast, computing even a single coalitional improvement move in matroid and single-commodity games is strongly NP-hard. In addition, we establish a variety of hardness results and lower bounds regarding the duration of unilateral and coalitional improvement dynamics. They continue to hold even for convergence to approximate equilibria.

博弈论计算复杂性网络路由算法设计