Optimal Purely Functional Priority Queues

Gerth Stølting Brodal and Chris Okasaki

In Journal of Functional Programming, volume 6(6), pages 839-858, 1996.

Abstract

Brodal recently introduced the first implementation of imperative priority queues to support findMin, insert, and meld in O(1) worst-case time, and deleteMin in O(log n) worst-case time. These bounds are asymptotically optimal among all comparison-based priority queues. In this paper, we adapt Brodal's data structure to a purely functional setting. In doing so, we both simplify the data structure and clarify its relationship to the binomial queues of Vuillemin, which support all four operations in O(log n) time. Specifically, we derive our implementation from binomial queues in three steps: first, we reduce the running time of insert to O(1) by eliminating the possibility of cascading links; second, we reduce the running time of findMin to O(1) by adding a global root to hold the minimum element; and finally, we reduce the running time of meld to O(1) by allowing priority queues to contain other priority queues. Each of these steps is expressed using ML-style functors. The last transformation, known as data-structural bootstrapping, is an interesting application of higher-order functors and recursive structures.

Copyright notice

© 1996 Cambridge University Press.

Online version

jfp96.pdf (245 Kb)

DOI

10.1017/S095679680000201X

BIBTEX entry

@article{jfp96,
  author = "Gerth St{\o}lting Brodal and Chris Okasaki",
  doi = "10.1017/S095679680000201X",
  issn = "0956-7968",
  journal = "Journal of Functional Programming",
  month = "November",
  number = "6",
  pages = "839-858",
  title = "Optimal Purely Functional Priority Queues",
  volume = "6",
  year = "1996"
}

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