We introduce and study a natural extension of the Alternating time temporal logic ATL, called Temporal Logic of Coalitional Goal Assignments (TLCGA). It features just one, but quite expressive, coalitional strategic operator, viz. the coalitional goal assignment operator, which is based on a mapping assigning to each set of players in the game its coalitional goal, formalised by a path formula of the language of TLCGA, i.e. a formula prefixed with a temporal operator X,U, or G, representing a temporalised objective for the respective coalition, describing the property of the plays on which that objective is satisfied. We establish fixpoint characterizations of the temporal goal assignments in a mu-calculus extension of TLCGA, discuss its expressiveness and illustrate it with some examples, prove bisimulation invariance and Hennessy-Milner property for it with respect to a suitably defined notion of bisimulation, construct a sound and complete axiomatic system for TLCGA, and obtain its decidability via finite model property.
翻译:我们引入并研究交替时间时间时间逻辑ATL的自然延伸,称为联合目标任务(TLGA)的时间逻辑(TLGA),它只包含一个但相当直观的联盟战略操作者,即联合目标分配操作者,它基于对游戏中每个玩家的分布图,其联合目标分配操作者,它以TLGA语言的路径公式(即与时间操作者X、U或G预先设定的公式)为正规化,它代表着各个联盟的一个时间化目标,描述满足该目标的剧本的属性。我们在TLGA的混合计算扩展中确定时间目标分配的固定点特征,讨论其表达性,并以一些实例加以说明,证明其变异性和Hennessy-Milner特性与适当界定的刺激概念有关,为TLCGA构建一个健全完整的氧化系统,并通过有限的模型属性获得其可变性。
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