On the Probabilistic Degree of OR over the Reals

Abstract

We study the probabilistic degree over reals of the OR function on n variables. For an error parameter ε in (0,1/3), the ε-error probabilistic degree of any Boolean function f over reals is the smallest non-negative integer d such that the following holds: there exists a distribution D of polynomials entirely supported on polynomials of degree at most d such that for all z ∈ \0,1\n, we have PrP D [P(z) = f(z) ] ≥ 1- ε. It is known from the works of Tarui (Theoret. Comput. Sci. 1993) and Beigel, Reingold, and Spielman ( Proc. 6th CCC 1991), that the ε-error probabilistic degree of the OR function is at most O( n. 1/ε). Our first observation is that this can be improved to O n≤ 1/ε, which is better for small values of ε. In all known constructions of probabilistic polynomials for the OR function (including the above improvement), the polynomials P in the support of the distribution D have the following special structure:P = 1 - (1-L1).(1-L2)...(1-Lt), where each Li(x1,..., xn) is a linear form in the variables x1,...,xn, i.e., the polynomial 1-P(x1,...,xn) is a product of affine forms. We show that the ε-error probabilistic degree of OR when restricted to polynomials of the above form is ( a/2 a ) where a = n≤ 1/ε. Thus matching the above upper bound (up to poly-logarithmic factors).