Simulating independence: New constructions of condensers, ramsey graphs, dispersers, and extractors

We present new explicit constructions of deterministic randomness extractors, dispersers and related objects. We say that a distribution X on binary strings of length n is a δ-source if X assigns probability at most 2 −δ n to any string of length n . For every δ>0, we construct the following poly...

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Veröffentlicht in:Journal of the ACM 2010-04, Vol.57 (4), p.1-52
Hauptverfasser: Barak, B, Kindler, G, Shaltiel, R, Sudakov, B, Wigderson, A
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Sprache:eng
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Zusammenfassung:We present new explicit constructions of deterministic randomness extractors, dispersers and related objects. We say that a distribution X on binary strings of length n is a δ-source if X assigns probability at most 2 −δ n to any string of length n . For every δ>0, we construct the following poly( n )-time computable functions: 2-source disperser: D:({0, 1} n ) 2 → {0, 1} such that for any two independent δ-sources X 1 , X 2 we have that the support of D ( X 1 , X 2 ) is {0, 1}. Bipartite Ramsey graph: Let N =2 n . A corollary is that the function D is a 2-coloring of the edges of K N,N (the complete bipartite graph over two sets of N vertices) such that any induced subgraph of size N δ by N δ is not monochromatic. 3-source extractor: E :({0, 1} n ) 3 → {0, 1} such that for any three independent δ-sources X 1 , X 2 , X 3 we have that E ( X 1 , X 2 , X 3 ) is o (1)-close to being an unbiased random bit. No previous explicit construction was known for either of these for any δ
ISSN:0004-5411
1557-735X
DOI:10.1145/1734213.1734214