Counting inequivalent monotone Boolean functions
Data Structures and Algorithms
2012-09-21 v1 Combinatorics
Abstract
Monotone Boolean functions (MBFs) are Boolean functions satisfying the monotonicity condition for any . The number of MBFs in n variables is known as the th Dedekind number. It is a longstanding computational challenge to determine these numbers exactly - these values are only known for at most 8. Two monotone Boolean functions are inequivalent if one can be obtained from the other by renaming the variables. The number of inequivalent MBFs in variables was known only for up to . In this paper we propose a strategy to count inequivalent MBF's by breaking the calculation into parts based on the profiles of these functions. As a result we are able to compute the number of inequivalent MBFs in 7 variables. The number obtained is 490013148.
Keywords
Cite
@article{arxiv.1209.4623,
title = {Counting inequivalent monotone Boolean functions},
author = {Tamon Stephen and Timothy Yusun},
journal= {arXiv preprint arXiv:1209.4623},
year = {2012}
}