Expressivity of Linear Temporal Logic for Pomset Languages of Higher Dimensional Automata

Abstract: Temporal logics are a powerful tool to specify properties of computational systems. For concurrent programs, Higher Dimensional Automata (HDA) are a very expressive model of non-interleaving concurrency. HDA recognize languages of partially ordered multisets, or pomsets. Recent work has shown that Monadic Second Order (MSO) logic is as expressive as HDA for pomset languages. In this paper, we investigate the class of pomset languages that are definable in First Order (FO) logic. As expected, this is a strict subclass of MSO-definable languages. In the case of words, Kamp's theorem states that FO is as expressive as Linear Temporal Logic (LTL). Our aim is to prove a variant of Kamp's theorem for pomset languages. Thus, we define a temporal logic called Sparse Pomset Temporal Logic (SPTL), and show that it is equivalent to FO, when there is no autoconcurrency.