Synthesis of Cost-Optimal Multi-Agent Systems for Resource Allocation

Nils Timm, J. Botha
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Abstract

Multi-agent systems for resource allocation (MRAs) have been introduced as a concept for modelling competitive resource allocation problems in distributed computing. An MRA is composed of a set of agents and a set of resources. Each agent has goals in terms of allocating certain resources. For MRAs it is typically of importance that they are designed in a way such that there exists a strategy that guarantees that all agents will achieve their goals. The corresponding model checking problem is to determine whether such a winning strategy exists or not, and the synthesis problem is to actually build the strategy. While winning strategies ensure that all goals will be achieved, following such strategies does not necessarily involve an optimal use of resources. In this paper, we present a technique that allows to synthesise cost-optimal solutions to distributed resource allocation problems. We consider a scenario where system components such as agents and resources involve costs. A multi-agent system shall be designed that is cost-minimal but still capable of accomplishing a given set of goals. Our approach synthesises a winning strategy that minimises the cumulative costs of the components that are required for achieving the goals. The technique is based on a propositional logic encoding and a reduction of the synthesis problem to the maximum satisfiability problem (Max-SAT). Hence, a Max-SAT solver can be used to perform the synthesis. From a truth assignment that maximises the number of satisfied clauses of the encoding a cost-optimal winning strategy as well as a cost-optimal system can be immediately derived.
资源分配中成本最优多智能体系统的综合
多智能体资源分配系统(MRAs)作为分布式计算中竞争性资源分配问题建模的一个概念被引入。MRA由一组代理和一组资源组成。每个代理在分配某些资源方面都有目标。对于mra来说,通常重要的是它们的设计方式,这样就存在一个保证所有代理将实现其目标的策略。相应的模型检验问题是确定是否存在这样的制胜策略,综合问题是实际构建该策略。虽然制胜战略确保了所有目标的实现,但遵循这样的战略并不一定涉及资源的最佳利用。在本文中,我们提出了一种技术,可以综合成本最优的解决方案,分布式资源分配问题。我们考虑这样一个场景,其中系统组件(如代理和资源)涉及成本。一个多智能体系统应该被设计成成本最低,但仍然能够完成一组给定的目标。我们的方法综合了一个制胜战略,将实现目标所需的组件的累积成本降至最低。该技术基于命题逻辑编码,将综合问题简化为最大可满足性问题(Max-SAT)。因此,可以使用Max-SAT求解器进行合成。从使编码的满足子句数量最大化的真值分配中,可以立即推导出成本最优的制胜策略和成本最优的系统。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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