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 |
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Format: | Artikel |
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 |
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ISSN: | 0004-5411 1557-735X |
DOI: | 10.1145/1734213.1734214 |