Your search keyword '"Mitchell, Rivka"' showing total 3 results

1. Random walks on Coxeter interchange graphs

Author

Buckland, Matthew, Kolesnik, Brett, Mitchell, Rivka, and Przybyłowski, Tomasz

Subjects

Mathematics - Combinatorics, Mathematics - Probability, 05C20, 11P21, 17B22, 20F55, 51F15, 51M20, 52B05, 60J10, 62J15

Abstract

A tournament is an orientation of a graph. Vertices are players and edges are games, directed away from the winner. Kannan, Tetali and Vempala and McShine showed that tournaments with given score sequence can be rapidly sampled, via simple random walks on the interchange graphs of Brualdi and Li. These graphs are generated by the cyclically directed triangle, in the sense that traversing an edge corresponds to the reversal of such a triangle in a tournament. We study Coxeter tournaments on Zaslavsky's signed graphs. These tournaments involve collaborative and solitaire games, as well as the usual competitive games. The interchange graphs are richer in complexity, as a variety of other generators are involved. We prove rapid mixing by an intricate application of Bubley and Dyer's method of path coupling, using a delicate re-weighting of the graph metric. Geometric connections with the Coxeter permutahedra introduced by Ardila, Castillo, Eur and Postnikov are discussed.

Published

2024

2. Tournaments on signed graphs

Author

Kolesnik, Brett, Mitchell, Rivka, and Przybyłowski, Tomasz

Subjects

Mathematics - Combinatorics, 05C20, 11P21, 17B22, 20F55, 51F15, 51M20, 52B05, 62J15

Abstract

We classify the set of tournament score sequences on signed graphs, generalizing a classical result of Landau. We also study the combinatorics of such tournaments with given score sequence. Specifically, we show that the Coxeter analogues of the interchange graphs introduced by Brualdi and Li remain degree regular. This degree can be interpreted geometrically, in terms of distances in the Coxeter permutahedra studied recently by Ardila, Castillo, Eur and Postnikov., Comment: v2: minor edits; results unchanged

Published

2023

3. Hipster random walks

Author

Addario-Berry, Louigi, Cairns, Hannah, Devroye, Luc, Kerriou, Celine, and Mitchell, Rivka

Subjects

Mathematics - Probability, Mathematics - Numerical Analysis, 60F05, 60K35 (Primary), 65M12, 35K65 (Secondary)

Abstract

We introduce and study a family of random processes on trees we call hipster random walks, special instances of which we heuristically connect to the min-plus binary trees introduced by Robin Pemantle and studied by Auffinger and Cable (2017; arXiv:1709.07849), and to the critical random hierarchical lattice studied by Hambly and Jordan (2004). We prove distributional convergence for the processes by showing that their evolutions can be understood as a discrete analogues of certain convection-diffusion equations, then using a combination of coupling arguments and results from the numerical analysis literature on convergence of numerical approximations of PDEs., Comment: 28 pages

Published

2019