Minimal transitive factorizations of permutations into cycles
Abstract
We introduce a new approach to an enumerative problem closely linked with the geometry of branched coverings; that is, we study the number of ways a permutation can be decomposed into a product of a given number of 2-cycles, 3-cycles, etc. with certain minimality and transitivity conditions imposed on the factors. The method is to encode such factorizations as planar maps with certain "descent structure" and apply a new combinatorial decomposition to make their enumeration more manageable. We apply our technique to count factorizations of permutations with one or two parts, extending earlier work of Goulden and Jackson. We also show how these methods are readily modified to count inequivalent factorizations, where equivalence is defined by permitting commutations of adjacent disjoint factors. Our technique permits a substantial generalization of recent work of Goulden, Jackson, and Latour, while allowing for a considerable simplification of their analysis.
Keywords
Cite
@article{arxiv.math/0610735,
title = {Minimal transitive factorizations of permutations into cycles},
author = {John Irving},
journal= {arXiv preprint arXiv:math/0610735},
year = {2007}
}
Comments
23 pages, 13 figures