English

Sparse juntas on the biased hypercube

Computational Complexity 2024-08-07 v6 Combinatorics

Abstract

We give a structure theorem for Boolean functions on the pp-biased hypercube which are ϵ\epsilon-close to degree dd in L2L_2, showing that they are close to sparse juntas. Our structure theorem implies that such functions are O(ϵCd+p)O(\epsilon^{C_d} + p)-close to constant functions. We pinpoint the exact value of the constant CdC_d. We also give an analogous result for monotone Boolean functions on the biased hypercube which are ϵ\epsilon-close to degree dd in L2L_2, showing that they are close to sparse DNFs. Our structure theorems are optimal in the following sense: for every d,ϵ,pd,\epsilon,p, we identify a class Fd,ϵ,p\mathcal{F}_{d,\epsilon,p} of degree dd sparse juntas which are O(ϵ)O(\epsilon)-close to Boolean (in the monotone case, width dd sparse DNFs) such that a Boolean function on the pp-biased hypercube is O(ϵ)O(\epsilon)-close to degree dd in L2L_2 iff it is O(ϵ)O(\epsilon)-close to a function in Fd,ϵ,p\mathcal{F}_{d,\epsilon,p}.

Keywords

Cite

@article{arxiv.1711.09428,
  title  = {Sparse juntas on the biased hypercube},
  author = {Irit Dinur and Yuval Filmus and Prahladh Harsha},
  journal= {arXiv preprint arXiv:1711.09428},
  year   = {2024}
}

Comments

44 pages. TheoretiCS journal article

R2 v1 2026-06-22T22:57:13.749Z