Kleene-Schützenberger and Büchi Theorems for Weighted Timed Automata

Quaas, Karin

08 July 2010

In 1994, Alur and Dill introduced timed automata as a simple mathematical model for modelling the behaviour of real-time systems. In this thesis, we extend timed automata with weights. More detailed, we equip both the states and transitions of a timed automaton with weights taken from an appropriate mathematical structure. The weight of a transition determines the weight for taking this transition, and the weight of a state determines the weight for letting time elapse in this state. Since the weight for staying in a state depends on time, this model, called weighted timed automata, has many interesting applications, for instance, in operations research and scheduling. We give characterizations for the behaviours of weighted timed automata in terms of rational expressions and logical formulas. These formalisms are useful for the specification of real-time systems with continuous resource consumption. We further investigate the relation between the behaviours of weighted timed automata and timed automata. Finally, we present important decidability results for weighted timed automata.

Weighted Timed Automata

Real-Time Systems

Weighted Logic

Gewichtete Zeitautomaten

Echtzeitsysteme

gewichtete Logik

ddc:000

Weighted tree automata and quantitative logics with a focus on ambiguity

Paul, Erik

20 October 2017

We relate various restrictions of a quantitative logic to subclasses of weighted tree automata. The subclasses are defined by the level of ambiguity allowed in the automata. This yields a generalization of the results by Stephan Kreutzer and Cristian Riveros, who considered the same problem for weighted automata over words. Along the way we also prove that a finitely ambiguous weighted tree automaton can be decomposed into unambiguous ones and define and analyze polynomial ambiguity for tree automata.

info:eu-repo/classification/ddc/000

ddc:000

Kleene-Schützenberger and Büchi Theorems for Weighted Timed Automata

Quaas, Karin

24 March 2010

In 1994, Alur and Dill introduced timed automata as a simple mathematical model for modelling the behaviour of real-time systems. In this thesis, we extend timed automata with weights. More detailed, we equip both the states and transitions of a timed automaton with weights taken from an appropriate mathematical structure. The weight of a transition determines the weight for taking this transition, and the weight of a state determines the weight for letting time elapse in this state. Since the weight for staying in a state depends on time, this model, called weighted timed automata, has many interesting applications, for instance, in operations research and scheduling. We give characterizations for the behaviours of weighted timed automata in terms of rational expressions and logical formulas. These formalisms are useful for the specification of real-time systems with continuous resource consumption. We further investigate the relation between the behaviours of weighted timed automata and timed automata. Finally, we present important decidability results for weighted timed automata.

info:eu-repo/classification/ddc/000

ddc:000