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Computing growth functions of braid monoids and counting vertex-labelled bipartite graphs

Published 31 Jan 2012 in math.GR, cs.DM, and math.CO | (1201.6506v3)

Abstract: We derive a recurrence relation for the number of simple vertex-labelled bipartite graphs with given degrees of the vertices and use this result to obtain a new method for computing the growth function of the Artin monoid of type $A_{n-1}$ with respect to the simple elements (permutation braids) as generators. Instead of matrices of size $2{n-1}\times 2{n-1}$, we use matrices of size $p(n)\times p(n)$, where $p(n)$ is the number of partitions of $n$.

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