Nearly Optimal List Labeling

May 01, 2024 Β· Declared Dead Β· πŸ› IEEE Annual Symposium on Foundations of Computer Science

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Authors Michael A. Bender, Alex Conway, MartΓ­n Farach-Colton, Hanna KomlΓ³s, Michal KouckΓ½, William Kuszmaul, Michael Saks arXiv ID 2405.00807 Category cs.DS: Data Structures & Algorithms Citations 4 Venue IEEE Annual Symposium on Foundations of Computer Science Last Checked 4 months ago
Abstract
The list-labeling problem captures the basic task of storing a dynamically changing set of up to $n$ elements in sorted order in an array of size $m = (1 + Θ(1))n$. The goal is to support insertions and deletions while moving around elements within the array as little as possible. Until recently, the best known upper bound stood at $O(\log^2 n)$ amortized cost. This bound, which was first established in 1981, was finally improved two years ago, when a randomized $O(\log^{3/2} n)$ expected-cost algorithm was discovered. The best randomized lower bound for this problem remains $Ω(\log n)$, and closing this gap is considered to be a major open problem in data structures. In this paper, we present the See-Saw Algorithm, a randomized list-labeling solution that achieves a nearly optimal bound of $O(\log n \operatorname{polyloglog} n)$ amortized expected cost. This bound is achieved despite at least three lower bounds showing that this type of result is impossible for large classes of solutions.
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