Skip to content

Latest commit

 

History

History
57 lines (43 loc) · 3.26 KB

README.md

File metadata and controls

57 lines (43 loc) · 3.26 KB

Build Status codecov Join the chat at https://gitter.im/nachinius/van_emde_boas_in_scala License Latest version

modified van Emde Boas Tree

the fastest successor/predecessor for integers set

A modified van Emde Boas data structure that achieves time complexity for successor/predecessor/insert/search/delete in O(lg w) (with high probability), where w is the bits of the word used to store the integer. Space complexity is O(n), where n is how many numbers are stored. Thus, the constrain is that lg n <= w, since any number must fit in a word.

If w is not too high, then this is optimal. In case w is too high, fusion trees are the best. However, dynamic versions of fusion tree only achieve expected O(lg n/lg w).

When lg w >= sqrt(lg(n)) is better to use fusion trees. However, for dinamyc fusion trees only expected O(lg n/lg w) has been achieved.

For example, in a static case, with a 32-bit word, w = 32 (as this current implementation that uses scala's Int which is 32-bit signed integer), static van Emde Boas should be used if n >~ 2^25 ~ 33 millon . Otherwise, static fusion trees should be preferred. In the same scenario, static, for 64-bit word, w = 64, this structure is better than fusion trees if n >~ 68 billon . You're likely to have memory problems with such big numbers, and you may want to switch to a distributed system. Due to its recursive nature, I imagine this structure is easy to implement in a distributed way.

The current implementation, handles scala's Int which is a signed 32-bit number. However, th

time complexity (with high probability)

  • search: O(lg w)
  • successor: O(lg w)
  • predecessor: O(lg w)
  • delete: O(lg w)
  • insert: O(lg w)

where n = 2^w is the maximum number that can be stored.

space complexity

  • O(n)
may TODO
  • Create performance tests
  • Measure memory consumption againt data size (n) and bit (w)
  • Create a complete immutable version
  • Improve usage of generators for performance tests
  • Do performance tests for Immutable Version
  • Compare performance between mutable and immutable
  • Write predecessor
  • Add delete
  • Allow any ordering
  • Augment the data structure
  • Compare to fusion tree
  • Compare to O(lg n) successor/predecessor of trees
  • Present performance results

features

  • immutable or mutable
  • dynamic
  • fully tested
  • with benchmarks code

References

  1. MIT 6.851 Advanced Data Structures, Erik Demaine lecture 11