Main Page

From Boolean Zoo
Revision as of 08:46, 28 October 2020 by Renan (talk | contribs) (Misc Topics)
Jump to: navigation, search

Introduction

Welcome to the Boolean Zoo!

A Boolean function is a function [math]f:\{-1,1\}^n \to \{-1,1\}[/math].

Inspired by the ComplexityZoo, the purpose of this wiki is to serve as a repository for examples and counterexamples in Boolean analysis. Ideally, each function page should briefly describe the function, and give a comprehensive list of all (interesting) known results about that function, together with a citation / link to that result. It should also give a comprehensive list of interesting results which are not known (aka "open problems").

Types of results that are of interest to this wiki include, but are not limited to:

  • Bounds and calculation of Fourier coefficients
  • Complexity of computation by various computational models
  • Query complexity and property testing
  • Information and functional inequalities
  • Noise sensitivity and stability
  • Whether the function is an extremal object of some property
  • Counting and enumeration
  • Comparison between different functions.

The Boolean Zoo is a collaborative project, and you yourself are one of the collaborators. Do you know of a function or property that isn't on the list? Add it! Did you prove, discover, or stumble upon an interesting theorem regarding a Boolean function? Cite it! You should read the editing guidelines.

Contact

The zoo is currently owned and maintained by Renan Gross, who can be contacted at renan.gross ~at~ weizmann.ac.il The zoo is currently unable to send emails. Please contact Renan for administrative and technical issues.

Difference from Wikipedia

As an encyclopedia, Wikipedia is great at giving a general overview of common functions and terms, but cannot delve into the details and results that are sometimes needed for research. The Boolean Zoo, on the other hand, will happily accept even the most exotic and niche of functions.

Boolean functions

Categories of Boolean functions

Misc Topics