Average Bias and Polynomial Sources

Abstract

We identify a new notion of pseudorandomness for randomness sources, which we call the average bias. Given a distribution Z over \0,1\n, its average bias is: bav(Z) =2-n Σc ∈ \0,1\n |Ez Z(-1) c, z|. A source with average bias at most 2-k has min-entropy at least k, and so low average bias is a stronger condition than high min-entropy. We observe that the inner product function is an extractor for any source with average bias less than 2-n/2. The notion of average bias especially makes sense for polynomial sources, i.e., distributions sampled by low-degree n-variate polynomials over F2. For the well-studied case of affine sources, it is easy to see that min-entropy k is exactly equivalent to average bias of 2-k. We show that for quadratic sources, min-entropy k implies that the average bias is at most 2-(k). We use this relation to design dispersers for separable quadratic sources with a min-entropy guarantee.