On the Structure of Boolean Functions with Small Spectral Norm

Abstract

In this paper we prove results regarding Boolean functions with small spectral norm (the spectral norm of f is \|f\|1=Σα|f(α)|). Specifically, we prove the following results for functions f:\0,1\n \0,1\ with \|f\|1=A. 1. There is a subspace V of co-dimension at most A2 such that f|V is constant. 2. f can be computed by a parity decision tree of size 2A2n2A. (a parity decision tree is a decision tree whose nodes are labeled with arbitrary linear functions.) 3. If in addition f has at most s nonzero Fourier coefficients, then f can be computed by a parity decision tree of depth A2 s. 4. For every 0<ε there is a parity decision tree of depth O(A2 + (1/ε)) and size 2O(A2) · \1/ε2,O((1/ε))2A\ that ε-approximates f. Furthermore, this tree can be learned, with probability 1-δ, using (n,(A2),1/ε,(1/δ)) membership queries. All the results above also hold (with a slight change in parameters) to functions f:Zpn \0,1\.