Cell-probe Lower Bounds for Dynamic Problems via a New Communication Model
Abstract
In this paper, we develop a new communication model to prove a data structure lower bound for the dynamic interval union problem. The problem is to maintain a multiset of intervals over with integer coordinates, supporting the following operations: - insert(a, b): add an interval to , provided that and are integers in ; - delete(a, b): delete a (previously inserted) interval from ; - query(): return the total length of the union of all intervals in . It is related to the two-dimensional case of Klee's measure problem. We prove that there is a distribution over sequences of operations with insertions and deletions, and queries, for which any data structure with any constant error probability requires time in expectation. Interestingly, we use the sparse set disjointness protocol of H\aa{}stad and Wigderson [ToC'07] to speed up a reduction from a new kind of nondeterministic communication games, for which we prove lower bounds. For applications, we prove lower bounds for several dynamic graph problems by reducing them from dynamic interval union.
Cite
@article{arxiv.1512.01293,
title = {Cell-probe Lower Bounds for Dynamic Problems via a New Communication Model},
author = {Huacheng Yu},
journal= {arXiv preprint arXiv:1512.01293},
year = {2015}
}