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JCT
2008
2008
A bijective proof of Jackson's formula for the number of factorizations of a cycle
Factorizations of the cyclic permutation (1 2 . . . N) into two permutations with respectively n and m cycles, or, equivalently, unicellular bicolored maps with N edges and n white and m black vertices, have been enumerated independantly by Jackson and Adrianov using evaluations of characters of the symmetric group. In this paper we present a bijection between unicellular partitioned bicolored maps and couples made of an ordered bicolored tree and a partial permutation, that allows for a combinatorial derivation of these results. Our work is closely related to a recent construction of Goulden and Nica for the celebrated Harer-Zagier formula, and indeed we provide a unified presentation of both bijections in terms of Eulerian tours in graphs. Key words: Symmetric group, factorizations, unicellular bicolored maps, permutations, bicolored trees, Harer-Zagier formula, Eulerian tours.
Real-time Traffic| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | JCT |
| Authors | Gilles Schaeffer, Ekaterina A. Vassilieva |
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