Weighted Linear Dynamic Logic

Author:

Droste Manfred1,Grabolle Gustav1,Rahonis George2

Affiliation:

1. Institut für Informatik, Universität Leipzig, D-04109 Leipzig, Germany

2. Department of Mathematics, Aristotle University of Thessaloniki, 54124 Thessaloniki, Greece

Abstract

We introduce a weighted linear dynamic logic (weighted LDL for short) and show the expressive equivalence of its formulas to weighted rational expressions. This adds a new characterization for recognizable series to the fundamental Schützenberger theorem. Surprisingly, the equivalence does not require any restriction to our weighted LDL. Our results hold over arbitrary (resp. totally complete) semirings for finite (resp. infinite) words. As a consequence, the equivalence problem for weighted LDL formulas over fields is decidable in doubly exponential time. In contrast to classical logics, we show that our weighted LDL is expressively incomparable to weighted LTL for finite words. We determine a fragment of the weighted LTL such that series over finite and infinite words definable by LTL formulas in this fragment are definable also by weighted LDL formulas. This is an extended version of [17].

Publisher

World Scientific Pub Co Pte Ltd

Subject

Computer Science (miscellaneous)

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