Bipartite Perfect Matching is in quasi-NC

January 23, 2016 ยท The Ethereal ยท ๐Ÿ› Symposium on the Theory of Computing

๐Ÿ”ฎ THE ETHEREAL: The Ethereal
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Authors Stephen A. Fenner, Rohit Gurjar, Thomas Thierauf arXiv ID 1601.06319 Category cs.CC: Computational Complexity Cross-listed cs.DM, cs.DS Citations 91 Venue Symposium on the Theory of Computing Last Checked 1 month ago
Abstract
We show that the bipartite perfect matching problem is in quasi-NC$^2$. That is, it has uniform circuits of quasi-polynomial size $n^{O(\log n)}$, and $O(log^2 n)$ depth. Previously, only an exponential upper bound was known on the size of such circuits with poly-logarithmic depth. We obtain our result by an almost complete derandomization of the famous Isolation Lemma when applied to yield an efficient randomized parallel algorithm for the bipartite perfect matching problem.
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