Annular embeddings of permutations for arbitrary genus

TL;DR

This paper introduces a new combinatorial formula for the distribution of cycle counts in permutations involving two fixed cycles, extending previous results related to graph embeddings on surfaces.

Contribution

It provides a novel formula for cycle distributions in permutations with two fixed cycles, linked to genus distributions of graph embeddings with two vertices.

Findings

New combinatorial formula for cycle distribution involving two fixed cycles

Algorithm for generating rooted forests containing a given forest

Extension of genus distribution results to graphs with two vertices

Abstract

In the symmetric group on a set of size 2n, let P_{2n} denote the conjugacy class of involutions with no fixed points (equivalently, we refer to these as ``pairings'', since each disjoint cycle has length 2). Harer and Zagier explicitly determined the distribution of the number of disjoint cycles in the product of a fixed cycle of length 2n and the elements of P_{2n}. Their famous result has been reproved many times, primarily because it can be interpreted as the genus distribution for 2-cell embeddings in an orientable surface,of a graph with a single vertex attached to n loops. In this paper we give a new formula for the cycle distribution when a fixed permutation with two cycles (say the lengths are p,q, where p+q=2n) is multiplied by the elements of P_{2n}. It can be interpreted as the genus distribution for 2-cell embeddings in an orientable surface, of a graph with two vertices, of degrees p and q. In terms of these graphs, the formula involves a parameter that allows us to specify, separately, the number of edges between the two vertices and the number of loops at each of the vertices. The proof is combinatorial, and uses a new algorithm that we introduce to create all rooted forests containing a given rooted forest.