Separation of AC0[] Formulas and Circuits

Abstract

This paper gives the first separation between the power of formulas and circuits of equal depth in the AC0[] basis (unbounded fan-in AND, OR, NOT and MOD2 gates). We show, for all d(n) O( n n), that there exist polynomial-size depth-d circuits that are not equivalent to depth-d formulas of size no(d) (moreover, this is optimal in that no(d) cannot be improved to nO(d)). This result is obtained by a combination of new lower and upper bounds for Approximate Majorities, the class of Boolean functions \0,1\n \0,1\ that agree with the Majority function on 3/4 fraction of inputs. AC0[] formula lower bound: We show that every depth-d AC0[] formula of size s has a 1/8-error polynomial approximation over F2 of degree O(1d s)d-1. This strengthens a classic O( s)d-1 degree approximation for circuits due to Razborov. Since the Majority function has approximate degree ( n), this result implies an ((dn1/2(d-1))) lower bound on the depth-d AC0[] formula size of all Approximate Majority functions for all d(n) O( n). Monotone AC0 circuit upper bound: For all d(n) O( n n), we give a randomized construction of depth-d monotone AC0 circuits (without NOT or MOD2 gates) of size (O(n1/2(d-1))) that compute an Approximate Majority function. This strengthens a construction of formulas of size (O(dn1/2(d-1))) due to Amano.