2 research outputs found
One Theorem to Rule Them All: A Unified Translation of LTL into {\omega}-Automata
We present a unified translation of LTL formulas into deterministic Rabin
automata, limit-deterministic B\"uchi automata, and nondeterministic B\"uchi
automata. The translations yield automata of asymptotically optimal size
(double or single exponential, respectively). All three translations are
derived from one single Master Theorem of purely logical nature. The Master
Theorem decomposes the language of a formula into a positive boolean
combination of languages that can be translated into {\omega}-automata by
elementary means. In particular, Safra's, ranking, and breakpoint constructions
used in other translations are not needed
Optimal transformations of Muller conditions
In this paper, we are interested in automata over infinite words and infinite
duration games, that we view as general transition systems. We study
transformations of systems using a Muller condition into ones using a parity
condition, extending Zielonka's construction. We introduce the alternating
cycle decomposition transformation, and we prove a strong optimality result:
for any given deterministic Muller automaton, the obtained parity automaton is
minimal both in size and number of priorities among those automata admitting a
morphism into the original Muller automaton.
We give two applications. The first is an improvement in the process of
determinisation of B\"uchi automata into parity automata by Piterman and
Schewe. The second is to present characterisations on the possibility of
relabelling automata with different acceptance conditions