From 6c8e5849392cc2541bbdb84d43ce4be2d7fe4319 Mon Sep 17 00:00:00 2001 From: Yuchen Pei Date: Thu, 1 Jul 2021 12:20:22 +1000 Subject: Removed files no longer in use. Also renamed agpl license file. --- ...-04-01-q-robinson-schensted-symmetry-paper.html | 53 ---------------------- 1 file changed, 53 deletions(-) delete mode 100644 site-from-md/posts/2014-04-01-q-robinson-schensted-symmetry-paper.html (limited to 'site-from-md/posts/2014-04-01-q-robinson-schensted-symmetry-paper.html') diff --git a/site-from-md/posts/2014-04-01-q-robinson-schensted-symmetry-paper.html b/site-from-md/posts/2014-04-01-q-robinson-schensted-symmetry-paper.html deleted file mode 100644 index 215183b..0000000 --- a/site-from-md/posts/2014-04-01-q-robinson-schensted-symmetry-paper.html +++ /dev/null @@ -1,53 +0,0 @@ - - - - - Symmetry property of \(q\)-weighted Robinson-Schensted algorithms and branching algorithms - - - - - -
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Symmetry property of \(q\)-weighted Robinson-Schensted algorithms and branching algorithms

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Posted on 2014-04-01

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In this paper a symmetry property analogous to the well known symmetry property of the normal Robinson-Schensted algorithm has been shown for the \(q\)-weighted Robinson-Schensted algorithm. The proof uses a generalisation of the growth diagram approach introduced by Fomin. This approach, which uses “growth graphs”, can also be applied to a wider class of insertion algorithms which have a branching structure.

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-Growth graph of q-RS for 1423
Growth graph of q-RS for 1423
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Above is the growth graph of the \(q\)-weighted Robinson-Schensted algorithm for the permutation \({1 2 3 4\choose1 4 2 3}\).

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