Automated temporal equilibrium analysis: Verification and synthesis of multi-player games

作者:

摘要

In the context of multi-agent systems, the rational verification problem is concerned with checking which temporal logic properties will hold in a system when its constituent agents are assumed to behave rationally and strategically in pursuit of individual objectives. Typically, those objectives are expressed as temporal logic formulae which the relevant agent desires to see satisfied. Unfortunately, rational verification is computationally complex, and requires specialised techniques in order to obtain practically useable implementations. In this paper, we present such a technique. This technique relies on a reduction of the rational verification problem to the solution of a collection of parity games. Our approach has been implemented in the Equilibrium Verification Environment (EVE) system. The EVE system takes as input a model of a concurrent/multi-agent system represented using the Simple Reactive Modules Language (SRML), where agent goals are represented as Linear Temporal Logic () formulae, together with a claim about the equilibrium behaviour of the system, also expressed as an formula. EVE can then check whether the claim holds on some (or every) computation of the system that could arise through agents choosing Nash equilibrium strategies; it can also check whether a system has a Nash equilibrium, and synthesise individual strategies for players in the multi-player game. After presenting our basic framework, we describe our new technique and prove its correctness. We then describe our implementation in the EVE system, and present experimental results which show that EVE performs favourably in comparison to other existing tools that support rational verification.

论文关键词:Multi-agent systems,Temporal logic,Nash equilibrium,Bisimulation invariance,Rational verification,Model checking,Synthesis

论文评审过程:Received 20 December 2018, Revised 16 June 2020, Accepted 19 June 2020, Available online 26 June 2020, Version of Record 3 July 2020.

论文官网地址:https://doi.org/10.1016/j.artint.2020.103353