An upper bound on the number of relevant variables for Boolean functions on the Hamming graph

Abstract

The spectrum of a complex-valued function f on Zqn is the set \|u|:u∈ Zqn~and~f(u)≠ 0\, where |u| is the Hamming weight of u and f is the Fourier transform of f. Let 1≤ d'≤ d≤ n. In this work, we study Boolean functions on Zqn, q≥ 3, whose spectrum is a subset of \0\ \d',…,d\. We prove that such functions have at most d2· qd+d'2d'(q-1)d' relevant variables for d'+d≤ n+1. In particular, we prove that any Boolean function of degree d on Zqn, q≥ 3, has at most dqd+14(q-1) relevant variables. We also show that any equitable 2-partition of the Hamming graph H(n,q), q≥ 3, associated with the eigenvalue n(q-1)-qd has at most d2· q2d2d(q-1)d relevant variables for d≤ n+12.

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