Combinatorial Markov chains on linear extensions
Abstract
We consider generalizations of Schuetzenberger's promotion operator on the set L of linear extensions of a finite poset of size n. This gives rise to a strongly connected graph on L. By assigning weights to the edges of the graph in two different ways, we study two Markov chains, both of which are irreducible. The stationary state of one gives rise to the uniform distribution, whereas the weights of the stationary state of the other has a nice product formula. This generalizes results by Hendricks on the Tsetlin library, which corresponds to the case when the poset is the anti-chain and hence L=S_n is the full symmetric group. We also provide explicit eigenvalues of the transition matrix in general when the poset is a rooted forest. This is shown by proving that the associated monoid is R-trivial and then using Steinberg's extension of Brown's theory for Markov chains on left regular bands to R-trivial monoids.
Keywords
Cite
@article{arxiv.1205.7074,
title = {Combinatorial Markov chains on linear extensions},
author = {Arvind Ayyer and Steven Klee and Anne Schilling},
journal= {arXiv preprint arXiv:1205.7074},
year = {2014}
}
Comments
35 pages, more examples of promotion, rephrased the main theorems in terms of discrete time Markov chains