Lazy Search Trees
October 17, 2020 Β· Declared Dead Β· π IEEE Annual Symposium on Foundations of Computer Science
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Authors
Bryce Sandlund, Sebastian Wild
arXiv ID
2010.08840
Category
cs.DS: Data Structures & Algorithms
Citations
5
Venue
IEEE Annual Symposium on Foundations of Computer Science
Last Checked
4 months ago
Abstract
We introduce the lazy search tree data structure. The lazy search tree is a comparison-based data structure on the pointer machine that supports order-based operations such as rank, select, membership, predecessor, successor, minimum, and maximum while providing dynamic operations insert, delete, change-key, split, and merge. We analyze the performance of our data structure based on a partition of current elements into a set of gaps $\{Ξ_i\}$ based on rank. A query falls into a particular gap and splits the gap into two new gaps at a rank $r$ associated with the query operation. If we define $B = \sum_i |Ξ_i| \log_2(n/|Ξ_i|)$, our performance over a sequence of $n$ insertions and $q$ distinct queries is $O(B + \min(n \log \log n, n \log q))$. We show $B$ is a lower bound. Effectively, we reduce the insertion time of binary search trees from $Ξ(\log n)$ to $O(\min(\log(n/|Ξ_i|) + \log \log |Ξ_i|, \; \log q))$, where $Ξ_i$ is the gap in which the inserted element falls. Over a sequence of $n$ insertions and $q$ queries, a time bound of $O(n \log q + q \log n)$ holds; better bounds are possible when queries are non-uniformly distributed. As an extreme case of non-uniformity, if all queries are for the minimum element, the lazy search tree performs as a priority queue with $O(\log \log n)$ time insert and decrease-key operations. The same data structure supports queries for any rank, interpolating between binary search trees and efficient priority queues. Lazy search trees can be implemented to operate mostly on arrays, requiring only $O(\min(q, n))$ pointers. Via direct reduction, our data structure also supports the efficient access theorems of the splay tree, providing a powerful data structure for non-uniform element access, both when the number of accesses is small and large.
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