Extractors for small zero-fixing sources

Abstract

A random variable X is an (n,k)-zero-fixing source if for some subset V⊂eq[n], X is the uniform distribution on the strings \0,1\n that are zero on every coordinate outside of V. An ε-extractor for (n,k)-zero-fixing sources is a mapping F:\0,1\n\0,1\m, for some m, such that F(X) is ε-close in statistical distance to the uniform distribution on \0,1\m for every (n,k)-zero-fixing source X. Zero-fixing sources were introduced by Cohen and Shinkar in [10] in connection with the previously studied extractors for bit-fixing sources. They constructed, for every μ>0, an efficiently computable extractor that extracts a positive fraction of entropy, i.e., (k) bits, from (n,k)-zero-fixing sources where k≥( n)2+μ. In this paper we present two different constructions of extractors for zero-fixing sources that are able to extract a positive fraction of entropy for k essentially smaller than n. The first extractor works for k≥ C n, for some constant C. The second extractor extracts a positive fraction of entropy for k≥ (i)n for any fixed i∈ N, where (i) denotes i-times iterated logarithm. The fraction of extracted entropy decreases with i. The first extractor is a function computable in polynomial time in~n (for ε=o(1), but not too small); the second one is computable in polynomial time when k≤α n/ n, where α is a positive constant. The subject studied in this paper is closely related to Ramsey theory. We use methods developed in Ramsey theory and our results can also be interpreted as a contribution to this field.