Abstract

The main result of this paper is an explicit disperser for two independent sources on n bits, each of entropy k=no(1). Put differently, setting N=2n and K=2k, we construct explicit N x N Boolean matrices for which no K x K submatrix is monochromatic. Viewed as adjacency matrices of bipartite graphs, this gives an explicit construction of K-Ramsey bipartite graphs of size N.This greatly improves the previous bound of k=o(n) of Barak, Kindler, Shaltiel, Sudakov and Wigderson [4]. It also significantly improves the 25-year record of k = Õ (√n) on the special case of Ramsey graphs, due to Frankl and Wilson [9].The construction uses (besides "classical" extractor ideas) almost all of the machinery developed in the last couple of years for extraction from independent sources, including: