Counting unate and balanced monotone Boolean functions

04/27/2023

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For n≤ 6, we provide the number of n-variable unate and monotone Boolean functions under various restrictions. Additionally, we provide the number of balanced 7-variable monotone Boolean functions.

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Counting unate and balanced monotone Boolean functions

Lower bound for monotone Boolean convolution

Partial Order on the set of Boolean Regulatory Functions

Monotone Boolean Functions, Feasibility/Infeasibility, LP-type problems and MaxCon

On the power of choice for Boolean functions

On the linear structures of Balanced functions and quadratic APN functions

A polynomial quantum computing algorithm for solving the dualization problem

Combinatorial and Algorithmic Properties of One Matrix Structure at Monotone Boolean Functions

Counting unate and balanced monotone Boolean functions

Related Research

Lower bound for monotone Boolean convolution

Partial Order on the set of Boolean Regulatory Functions

Monotone Boolean Functions, Feasibility/Infeasibility, LP-type problems and MaxCon

On the power of choice for Boolean functions

On the linear structures of Balanced functions and quadratic APN functions

A polynomial quantum computing algorithm for solving the dualization problem

Combinatorial and Algorithmic Properties of One Matrix Structure at Monotone Boolean Functions