Coalgebraic automata theory : basic results

Kupke, Clemens and Venema, Yde (2008) Coalgebraic automata theory : basic results. Logical Methods in Computer Science, 4 (4). 10. ISSN 1860-5974 (https://doi.org/10.2168/LMCS-4(4:10)2008)

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Abstract

We generalize some of the central results in automata theory to the abstraction level of coalgebras and thus lay out the foundations of a universal theory of automata operating on infinite objects. Let F be any set functor that preserves weak pullbacks. We show that the class of recognizable languages of F-coalgebras is closed under taking unions, intersections, and projections. We also prove that if a nondeterministic F-automaton accepts some coalgebra it accepts a finite one of the size of the automaton. Our main technical result concerns an explicit construction which transforms a given alternating F-automaton into an equivalent nondeterministic one, whose size is exponentially bound by the size of the original automaton.

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