4,486 research outputs found
Balanced Families of Perfect Hash Functions and Their Applications
The construction of perfect hash functions is a well-studied topic. In this
paper, this concept is generalized with the following definition. We say that a
family of functions from to is a -balanced -family
of perfect hash functions if for every , , the number
of functions that are 1-1 on is between and for some
constant . The standard definition of a family of perfect hash functions
requires that there will be at least one function that is 1-1 on , for each
of size . In the new notion of balanced families, we require the number
of 1-1 functions to be almost the same (taking to be close to 1) for
every such . Our main result is that for any constant , a
-balanced -family of perfect hash functions of size can be constructed in time .
Using the technique of color-coding we can apply our explicit constructions to
devise approximation algorithms for various counting problems in graphs. In
particular, we exhibit a deterministic polynomial time algorithm for
approximating both the number of simple paths of length and the number of
simple cycles of size for any
in a graph with vertices. The approximation is up to any fixed desirable
relative error
Variations on Classical and Quantum Extractors
Many constructions of randomness extractors are known to work in the presence
of quantum side information, but there also exist extractors which do not
[Gavinsky {\it et al.}, STOC'07]. Here we find that spectral extractors
with a bound on the second largest eigenvalue
are quantum-proof. We then discuss fully
quantum extractors and call constructions that also work in the presence of
quantum correlations decoupling. As in the classical case we show that spectral
extractors are decoupling. The drawback of classical and quantum spectral
extractors is that they always have a long seed, whereas there exist classical
extractors with exponentially smaller seed size. For the quantum case, we show
that there exists an extractor with extremely short seed size
, where denotes the quality of the
randomness. In contrast to the classical case this is independent of the input
size and min-entropy and matches the simple lower bound
.Comment: 7 pages, slightly enhanced IEEE ISIT submission including all the
proof
Perfect Hash Families: The Generalization to Higher Indices
Perfect hash families are often represented as combinatorial arrays encoding partitions of kitems into v classes, so that every t or fewer of the items are completely separated by at least a specified number of chosen partitions. This specified number is the index of the hash family. The case when each t-set must be separated at least once has been extensively researched; they arise in diverse applications, both directly and as fundamental ingredients in a column replacement strategy for a variety of combinatorial arrays. In this paper, construction techniques and algorithmic methods for constructing perfect hash families are surveyed, in order to explore extensions to the situation when each t-set must be separated by more than one partition.https://digitalcommons.usmalibrary.org/books/1029/thumbnail.jp
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