A translation of weighted LTL formulas to weighted B\"uchi automata over ω-valuation monoids

Abstract

In this paper we introduce a weighted LTL over product ω-valuation monoids that satisfy specific properties. We also introduce weighted generalized B\"uchi automata with -transitions, as well as weighted B\"uchi automata with -transitions over product ω-valuation monoids and prove that these two models are expressively equivalent and also equivalent to weighted B\"uchi automata already introduced in the literature. We prove that every formula of a syntactic fragment of our logic can be effectively translated to a weighted generalized B\"uchi automaton with -transitions. For generalized product ω-valuation monoids that satisfy specific properties we define a weighted LTL, weighted generalized B\"uchi automata with -transitions, and weighted B\"uchi automata with -transitions, and we prove the aforementioned results for generalized product ω-valuation monoids as well. The translation of weighted LTL formulas to weighted generalized B\"uchi automata with -transitions is now obtained for a restricted syntactical fragment of the logic.