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RESEARCH PRODUCT
The Descriptive Complexity Approach to LOGCFL
Clemens LautemannThomas SchwentickHeribert VollmerPierre Mckenziesubject
Discrete mathematicsUnary operationComputer science0102 computer and information sciences02 engineering and technologyComputer Science::Computational ComplexityArityDescriptive complexity theory01 natural sciencesNondeterministic algorithm010201 computation theory & mathematicsDeterministic automatonBIT predicate0202 electrical engineering electronic engineering information engineering020201 artificial intelligence & image processingNondeterministic finite automatonLOGCFLdescription
Building upon the known generalized-quantifier-based firstorder characterization of LOGCFL, we lay the groundwork for a deeper investigation. Specifically, we examine subclasses of LOGCFL arising from varying the arity and nesting of groupoidal quantifiers. Our work extends the elaborate theory relating monoidal quantifiers to NC1 and its subclasses. In the absence of the BIT predicate, we resolve the main issues: we show in particular that no single outermost unary groupoidal quantifier with FO can capture all the context-free languages, and we obtain the surprising result that a variant of Greibach's "hardest contextfree language" is LOGCFL-complete under quantifier-free BIT-free interpretations. We then prove that FO with unary groupoidal quantifiers is strictly more expressive with the BIT predicate than without. Considering a particular groupoidal quantifier, we prove that first-order logic with majority of pairs is strictly more expressive than first-order with majority of individuals. As a technical tool of independent interest, we define the notion of an aperiodic nondeterministic finite automaton and prove that FO translations are precisely the mappings computed by single-valued aperiodic nondeterministic finite transducers.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1999-01-01 |