Bohr's phenomenon for functions on the Boolean cube

Abstract

We study the asymptotic decay of the Fourier spectrum of real functions f \-1,1\N → R in the spirit of Bohr's phenomenon from complex analysis. Every such function admits a canonical representation through its Fourier-Walsh expansion f(x) = ΣS⊂ \1,…,N\f(S) xS \,, where xS = Πk ∈ S xk. Given a class F of functions on the Boolean cube \-1, 1\N , the Boolean radius of F is defined to be the largest ≥ 0 such that ΣS|f(S)| |S| ≤ \|f\|∞ for every f ∈ F. We give the precise asymptotic behaviour of the Boolean radius of several natural subclasses of functions on finite Boolean cubes, as e.g. the class of all real functions on \-1, 1\N, the subclass made of all homogeneous functions or certain threshold functions. Compared with the classical complex situation subtle differences as well as striking parallels occur.