Dynamic Membership for Regular Languages

TL;DR

This paper investigates the dynamic membership problem for regular languages, providing complexity bounds for various classes and establishing a conditional trichotomy based on algebraic properties.

Contribution

It introduces a classification of regular languages based on dynamic membership complexity, resolving open problems and establishing bounds for different algebraic classes.

Findings

O(1) complexity for certain algebraic classes

Conditional lower bounds for non-qualifying languages

Classification of languages based on dynamic word problem complexity

Abstract

We study the dynamic membership problem for regular languages: fix a language L, read a word w, build in time O(|w|) a data structure indicating if w is in L, and maintain this structure efficiently under letter substitutions on w. We consider this problem on the unit cost RAM model with logarithmic word length, where the problem always has a solution in O(log |w| / log log |w|) per operation. We show that the problem is in O(log log |w|) for languages in an algebraically-defined, decidable class QSG, and that it is in O(1) for another such class QLZG. We show that languages not in QSG admit a reduction from the prefix problem for a cyclic group, so that they require {\Omega}(log |w| / log log |w|) operations in the worst case; and that QSG languages not in QLZG admit a reduction from the prefix problem for the multiplicative monoid U 1 = {0, 1}, which we conjecture cannot be maintained in O(1). This yields a conditional trichotomy. We also investigate intermediate cases between O(1) and O(log log |w|). Our results are shown via the dynamic word problem for monoids and semigroups, for which we also give a classification. We thus solve open problems of the paper of Skovbjerg Frandsen, Miltersen, and Skyum [30] on the dynamic word problem, and additionally cover regular languages.