#9217 - The Big-O Problem

Dmitry Chistikov ; Stefan Kiefer ; Andrzej S. Murawski ; David Purser - The Big-O Problem

lmcs:7343 - Logical Methods in Computer Science, March 15, 2022, Volume 18, Issue 1 - https://doi.org/10.46298/lmcs-18(1:40)2022
The Big-O ProblemArticle

Authors: Dmitry Chistikov ; Stefan Kiefer ; Andrzej S. Murawski ; David Purser

    Given two weighted automata, we consider the problem of whether one is big-O of the other, i.e., if the weight of every finite word in the first is not greater than some constant multiple of the weight in the second. We show that the problem is undecidable, even for the instantiation of weighted automata as labelled Markov chains. Moreover, even when it is known that one weighted automaton is big-O of another, the problem of finding or approximating the associated constant is also undecidable. Our positive results show that the big-O problem is polynomial-time solvable for unambiguous automata, coNP-complete for unlabelled weighted automata (i.e., when the alphabet is a single character) and decidable, subject to Schanuel's conjecture, when the language is bounded (i.e., a subset of $w_1^*\dots w_m^*$ for some finite words $w_1,\dots,w_m$) or when the automaton has finite ambiguity. On labelled Markov chains, the problem can be restated as a ratio total variation distance, which, instead of finding the maximum difference between the probabilities of any two events, finds the maximum ratio between the probabilities of any two events. The problem is related to $\varepsilon$-differential privacy, for which the optimal constant of the big-O notation is exactly $\exp(\varepsilon)$.


    Volume: Volume 18, Issue 1
    Published on: March 15, 2022
    Accepted on: February 1, 2022
    Submitted on: April 9, 2021
    Keywords: Computer Science - Formal Languages and Automata Theory,Computer Science - Logic in Computer Science

    1 Document citing this article

    Consultation statistics

    This page has been seen 2022 times.
    This article's PDF has been downloaded 860 times.