Extensions of $ω$-Regular Languages

Published 21 Feb 2020 in cs.FL and cs.LO | (2002.09393v1)

Abstract: We consider extensions of monadic second order logic over $\omega$-words, which are obtained by adding one language that is not $\omega$-regular. We show that if the added language $L$ has a neutral letter, then the resulting logic is necessarily undecidable. A corollary is that the $\omega$-regular languages are the only decidable Boolean-closed full trio over $\omega$-words.

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