On the Degree of Boolean Functions as Polynomials over Zm

Abstract

Polynomial representations of Boolean functions over various rings such as Z and Zm have been studied since Minsky and Papert (1969). From then on, they have been employed in a large variety of fields including communication complexity, circuit complexity, learning theory, coding theory and so on. For any integer m2, each Boolean function has a unique multilinear polynomial representation over ring Zm. The degree of such polynomial is called modulo-m degree, denoted as degm(·). In this paper, we investigate the lower bound of modulo-m degree of Boolean functions. When m=pk (k 1) for some prime p, we give a tight lower bound that degm(f)≥ k(p-1) for any non-degenerated function f:\0,1\n\0,1\, provided that n is sufficient large. When m contains two different prime factors p and q, we give a nearly optimal lower bound for any symmetric function f:\0,1\n\0,1\ that degm(f) ≥ n2+1p-1+1q-1.