Permutation graphs, fast forward permutations, and sampling the cycle structure of a permutation
Abstract
A permutation P on {1,..,N} is a_fast_forward_permutation_ if for each m the computational complexity of evaluating P^m(x)$ is small independently of m and x. Naor and Reingold constructed fast forward pseudorandom cycluses and involutions. By studying the evolution of permutation graphs, we prove that the number of queries needed to distinguish a random cyclus from a random permutation on {1,..,N} is Theta(N) if one does not use queries of the form P^m(x), but is only Theta(1) if one is allowed to make such queries. We construct fast forward permutations which are indistinguishable from random permutations even when queries of the form P^m(x) are allowed. This is done by introducing an efficient method to sample the cycle structure of a random permutation, which in turn solves an open problem of Naor and Reingold.
Keywords
Cite
@article{arxiv.cs/0207027,
title = {Permutation graphs, fast forward permutations, and sampling the cycle structure of a permutation},
author = {Boaz Tsaban},
journal= {arXiv preprint arXiv:cs/0207027},
year = {2010}
}
Comments
Corrected a small error