Bounded situation calculus action theories

作者:

摘要

In this paper,1 we investigate bounded action theories in the situation calculus. A bounded action theory is one which entails that, in every situation, the number of object tuples in the extension of fluents is bounded by a given constant, although such extensions are in general different across the infinitely many situations. We argue that such theories are common in applications, either because facts do not persist indefinitely or because the agent eventually forgets some facts, as new ones are learned. We discuss various classes of bounded action theories. Then we show that verification of a powerful first-order variant of the μ-calculus is decidable for such theories. Notably, this variant supports a controlled form of quantification across situations. We also show that through verification, we can actually check whether an arbitrary action theory maintains boundedness.

论文关键词:Knowledge representation,Reasoning about action,Situation calculus,Verification

论文评审过程:Received 7 June 2015, Revised 7 April 2016, Accepted 20 April 2016, Available online 3 May 2016, Version of Record 10 May 2016.

论文官网地址:https://doi.org/10.1016/j.artint.2016.04.006