Bent function: Difference between revisions

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A bent function is a boolean function of ${\displaystyle n}$ variables that have nonlinearity equal to ${\displaystyle 2^{n-1}-2^{n/2-1}}$. Walsh-Adamar coefficients of bent function are equal to ${\displaystyle \pm 2^{n/2}}$. This gives the alternative definition of bent functions. Bent functions have even number of variables and achive the bound of maximal possible nonlinearity. This makes them a good blocks for cryptographics stream cyphers. Bent functions is a specific case of plateaued functions.

Main properties

One of the most usefull property distinguishing bent functions uses derivatives:

A boolean function ${\displaystyle f}$ is bent if and only if every derivative ${\displaystyle D_{u}f(x)}$ is balanced for ${\displaystyle u\neq 0}$.

The minimal degree of bent function is ${\displaystyle 2}$ (the function ${\displaystyle x_{1}x_{2}+x_{3}x_{4}+\cdots +x_{2n-1}x_{2n}}$ is bent), the maximal degree of bent function of ${\displaystyle 2n}$ variables is ${\displaystyle n}$.

Dual bent function

Signs of Walsh-Adamar coefficients can be transformed to another boolean function of the same number of variables. This function is also bent and is called dual bent function. The dual function to the dual function is the function itself.

Bent function series

Bent function constructions

Bent function enumeration

For the number of bent function ${\displaystyle B_{2n}}$ very little is know. ${\displaystyle B_{2}=8,B_{4}=896,B_{6}=5\,425\,430\,528}$. Because degree of bent function is bounded by ${\displaystyle n}$ it is easy to show that ${\displaystyle B_{2n}\leq 2^{2^{2n-1}+{\frac {1}{2}}{2n \choose n}}}$. This result can be slighly improved but still remain very far from the truth.