Reachability is harder for directed than for undirected finite graphs

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Journal of Symbolic Logic 55 (1):113-150 (1990)
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Abstract

Although it is known that reachability in undirected finite graphs can be expressed by an existential monadic second-order sentence, our main result is that this is not the case for directed finite graphs (even in the presence of certain "built-in" relations, such as the successor relation). The proof makes use of Ehrenfeucht-Fraisse games, along with probabilistic arguments. However, we show that for directed finite graphs with degree at most k, reachability is expressible by an existential monadic second-order sentence

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10.2307/2274958

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Citations of this work

Generalized quantifiers.Dag Westerståhl - 2008 - Stanford Encyclopedia of Philosophy.
Arity and alternation in second-order logic.J. A. Makowsky & Y. B. Pnueli - 1994 - Annals of Pure and Applied Logic 78 (1-3):189-202.

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References found in this work

¹1-formulae on finite structures.M. Ajtai - 1983 - Annals of Pure and Applied Logic 24 (1):1.
Monadic generalized spectra.Ronald Fagin - 1975 - Mathematical Logic Quarterly 21 (1):89-96.

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