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Irit Dinur ; Yuval Filmus ; Prahladh Harsha - Sparse juntas on the biased hypercubetheoretics:11523 - TheoretiCS, July 30, 2024, Volume 3 - https://doi.org/10.46298/theoretics.24.18
Sparse juntas on the biased hypercubeArticle

Authors: Irit Dinur ORCID; Yuval Filmus ORCID; Prahladh Harsha ORCID

    We give a structure theorem for Boolean functions on the $p$-biased hypercube which are $\epsilon$-close to degree $d$ in $L_2$, showing that they are close to sparse juntas. Our structure theorem implies that such functions are $O(\epsilon^{C_d} + p)$-close to constant functions. We pinpoint the exact value of the constant $C_d$. We also give an analogous result for monotone Boolean functions on the biased hypercube which are $\epsilon$-close to degree $d$ in $L_2$, showing that they are close to sparse DNFs. Our structure theorems are optimal in the following sense: for every $d,\epsilon,p$, we identify a class $\mathcal{F}_{d,\epsilon,p}$ of degree $d$ sparse juntas which are $O(\epsilon)$-close to Boolean (in the monotone case, width $d$ sparse DNFs) such that a Boolean function on the $p$-biased hypercube is $O(\epsilon)$-close to degree $d$ in $L_2$ iff it is $O(\epsilon)$-close to a function in $\mathcal{F}_{d,\epsilon,p}$.


    Volume: Volume 3
    Published on: July 30, 2024
    Accepted on: May 25, 2024
    Submitted on: June 30, 2023
    Keywords: Computer Science - Computational Complexity,Mathematics - Combinatorics

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