More Efficient k-wise Independent Permutations from Random Reversible Circuits via log-Sobolev Inequalities

Abstract

We prove that the permutation computed by a reversible circuit with O(nk· (1/)) random 3-bit gates is -approximately k-wise independent. Our bound improves on currently known bounds in the regime when the approximation error is not too small. We obtain our results by analyzing the log-Sobolev constants of appropriate Markov chains rather than their spectral gaps.

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