Entropy influence conjecture

In mathematics, the entropy influence conjecture is a statement about Boolean functions originally conjectured by Ehud Friedgut and Gil Kalai in 1996.^[1]

Statement

For a function ${\displaystyle f:\{-1,1\}^{n}\to \{-1,1\},}$  note its Fourier expansion

${\displaystyle f(x)=\sum _{S\subset [n]}{\widehat {f}}(S)x_{S},{\text{ where }}x_{S}=\prod _{i\in S}x_{i}.}$ 

The entropy–influence conjecture states that there exists an absolute constant C such that ${\displaystyle H(f)\leq CI(f),}$  where the total influence ${\displaystyle I}$  is defined by

${\displaystyle I(f)=\sum _{S}|S|{\widehat {f}}(S)^{2},}$ 

and the entropy ${\displaystyle H}$  (of the spectrum) is defined by

${\displaystyle H(f)=-\sum _{S}{\widehat {f}}(S)^{2}\log {\widehat {f}}(S)^{2},}$ 

(where x log x is taken to be 0 when x = 0).

See also

• Analysis of Boolean functions

References

1. Friedgut, Ehud; Kalai, Gil (1996). "Every monotone graph property has a sharp threshold". Proceedings of the American Mathematical Society. 124 (10): 2993–3002. doi:10.1090/s0002-9939-96-03732-x.

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