Abstract. This paper makes two contributions towards determining some well-studied optimal constants in Fourier analysis of Boolean functions and high-dimensional geometry. 1. It has been known since 1994 [GL94] that every linear threshold function has squared Fourier mass at least 1/2 on its degree-0 and degree-1 coefficients. Denote the minimum such Fourier mass by W≤1[LTF], where the mini-mum is taken over all n-variable linear threshold functions and all n ≥ 0. Benjamini, Kalai and Schramm [BKS99] have conjectured that the true value ofW≤1[LTF] is 2/pi. We make progress on this conjecture by proving that W≤1[LTF] ≥ 1/2+c for some absolute constant c> 0. The key ingredient in our proof is a “robust ” version of the well-known Khintch...
AbstractSeveral inequalities of Kahane-Khintchine′s type in certain Orlicz spaces are proved. For th...
htmlabstractIn this paper we derive new upper bounds for the densities of measurable sets in R^n whi...
AbstractA Boolean response to a random binary input of length n can be modeled as a {;0, 1}- valued ...
Abstract. This paper makes two contributions towards determining some well-studied optimal constants...
First, the Khintchine inequality and several proofs of it will be investigated, then the proof for t...
The best constants for subquadratic Rademacher averages for the Banach spaces L"(X, m) are BP =...
AbstractA function f:{−1,1}n→R is called pseudo-Boolean. It is well-known that each pseudo-Boolean f...
textWe prove several inequalities involving the Fourier transform of functions which are compactly s...
This article accompanies a tutorial talk given at the 40th ACM STOC conference. In it, we give a bri...
The Chow parameters of a Boolean function f: {−1, 1}n → {−1, 1} are its n + 1 degree-0 and degree-1 ...
Given a Boolean function f:{ -1,1}n → {-1,1}, define the Fourier distribution to be the distribution...
Given any linear threshold function f on n Boolean vari-ables, we construct a linear threshold funct...
Among functions f majorized by indicator functions of sets E of measure 1, which functions have maxi...
The topic of discrete Fourier analysis has been extensively studied in recent decades. It plays an i...
Given a Boolean function f : {−1, 1}n → {−1, 1}, define the Fourier distribution to be the distribut...
AbstractSeveral inequalities of Kahane-Khintchine′s type in certain Orlicz spaces are proved. For th...
htmlabstractIn this paper we derive new upper bounds for the densities of measurable sets in R^n whi...
AbstractA Boolean response to a random binary input of length n can be modeled as a {;0, 1}- valued ...
Abstract. This paper makes two contributions towards determining some well-studied optimal constants...
First, the Khintchine inequality and several proofs of it will be investigated, then the proof for t...
The best constants for subquadratic Rademacher averages for the Banach spaces L"(X, m) are BP =...
AbstractA function f:{−1,1}n→R is called pseudo-Boolean. It is well-known that each pseudo-Boolean f...
textWe prove several inequalities involving the Fourier transform of functions which are compactly s...
This article accompanies a tutorial talk given at the 40th ACM STOC conference. In it, we give a bri...
The Chow parameters of a Boolean function f: {−1, 1}n → {−1, 1} are its n + 1 degree-0 and degree-1 ...
Given a Boolean function f:{ -1,1}n → {-1,1}, define the Fourier distribution to be the distribution...
Given any linear threshold function f on n Boolean vari-ables, we construct a linear threshold funct...
Among functions f majorized by indicator functions of sets E of measure 1, which functions have maxi...
The topic of discrete Fourier analysis has been extensively studied in recent decades. It plays an i...
Given a Boolean function f : {−1, 1}n → {−1, 1}, define the Fourier distribution to be the distribut...
AbstractSeveral inequalities of Kahane-Khintchine′s type in certain Orlicz spaces are proved. For th...
htmlabstractIn this paper we derive new upper bounds for the densities of measurable sets in R^n whi...
AbstractA Boolean response to a random binary input of length n can be modeled as a {;0, 1}- valued ...