English

Collectively canalizing Boolean functions

Discrete Mathematics 2023-06-07 v3 Combinatorics Molecular Networks

Abstract

This paper studies the mathematical properties of collectively canalizing Boolean functions, a class of functions that has arisen from applications in systems biology. Boolean networks are an increasingly popular modeling framework for regulatory networks, and the class of functions studied here captures a key feature of biological network dynamics, namely that a subset of one or more variables, under certain conditions, can dominate the value of a Boolean function, to the exclusion of all others. These functions have rich mathematical properties to be explored. The paper shows how the number and type of such sets influence a function's behavior and define a new measure for the canalizing strength of any Boolean function. We further connect the concept of collective canalization with the well-studied concept of the average sensitivity of a Boolean function. The relationship between Boolean functions and the dynamics of the networks they form is important in a wide range of applications beyond biology, such as computer science, and has been studied with statistical and simulation-based methods. But the rich relationship between structure and dynamics remains largely unexplored, and this paper is intended as a contribution to its mathematical foundation.

Keywords

Cite

@article{arxiv.2008.13741,
  title  = {Collectively canalizing Boolean functions},
  author = {Claus Kadelka and Benjamin Keilty and Reinhard Laubenbacher},
  journal= {arXiv preprint arXiv:2008.13741},
  year   = {2023}
}

Comments

17 pages, 3 figures

R2 v1 2026-06-23T18:13:03.858Z