Swapneel Mahajan
Published 2001-08-13Version 1
The random-to-top and the riffle shuffle are two well-studied methods for shuffling a deck of cards. These correspond to the symmetric group $S_n$, i.e., the Coxeter group of type $A_{n-1}$. In this paper, we give analogous shuffles for the Coxeter groups of type $B_n$ and $D_n$. These can be interpreted as shuffles on a ``signed'' deck of cards. With these examples as motivation, we abstract the notion of a shuffle algebra which captures the connection between the algebraic structure of the shuffles and the geometry of the Coxeter groups. We also briefly discuss the generalisation to buildings which leads to q-analogues.
The Worpitzky identity for the groups of signed and even-signed permutations
Stack-Sorting for Coxeter Groups
Transitive factorisations in the symmetric group, and combinatorial aspects of singularity theory
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