Non-Empty Bins with Simple Tabulation Hashing
Abstract
We consider the hashing of a set with using a simple tabulation hash function and analyse the number of non-empty bins, that is, the size of . We show that the expected size of matches that with fully random hashing to within low-order terms. We also provide concentration bounds. The number of non-empty bins is a fundamental measure in the balls and bins paradigm, and it is critical in applications such as Bloom filters and Filter hashing. For example, normally Bloom filters are proportioned for a desired low false-positive probability assuming fully random hashing (see \url{en.wikipedia.org/wiki/Bloom_filter}). Our results imply that if we implement the hashing with simple tabulation, we obtain the same low false-positive probability for any possible input.
Cite
@article{arxiv.1810.13187,
title = {Non-Empty Bins with Simple Tabulation Hashing},
author = {Anders Aamand and Mikkel Thorup},
journal= {arXiv preprint arXiv:1810.13187},
year = {2018}
}
Comments
To appear at SODA'19