Regular Separability and Intersection Emptiness are Independent Problems

Abstract

The problem of regular separability asks, given two languages K and L, whether there exists a regular language S with K⊂eq S and S L=. This problem has recently been studied for various classes of languages. All the results on regular separability obtained so far exhibited a noteworthy correspondence with the intersection emptiness problem: In eachcase, regular separability is decidable if and only if intersection emptiness is decidable. This raises the question whether under mild assumptions, regular separability can be reduced to intersection emptiness and vice-versa. We present counterexamples showing that none of the two problems can be reduced to the other. More specifically, we describe language classes C1, D1, C2, D2 such that (i)~intersection emptiness is decidable for C1 and D1, but regular separability is undecidable for C1 and D1 and (ii)~regular separability is decidable for C2 and D2, but intersection emptiness is undecidable for C2 and D2.