论文信息 - The combinatorial relationship between trees, cacti and certain connection coefficients for the symmetric group

The combinatorial relationship between trees, cacti and certain connection coefficients for the symmetric group

A combinatorial bijection is given between pairs of permutations in S n the product of which is a given n -cycle and two-coloured plane edge-rooted trees on n edges, when the numbers of cycles in the disjoint cycle representations of the permutations sum to n + 1. Thus the corresponding connection coefficient for the symmetric group is determined by enumerating these trees with respect to appropriate characteristics. This is extended to the case of m -tuples of permutations in S n the product of which is a given n -cycle, in which the combinatorial objects replacing trees are cacti of m -gons.

Ian P. Goulden | David M. Jackson | I. Goulden | D. Jackson

[1] Richard P. Stanley,et al. Factorization of permutations into n-cycles , 1981, Discret. Math..

[2] David M. Jackson. Some combinatorial problems associated with products of conjugacy classes of the symmetric group , 1988, J. Comb. Theory, Ser. A.

[3] David M. Jackson,et al. Character theory and rooted maps in an orientable surface of given genus: face-colored maps , 1990 .

[4] G. Boccara,et al. Nombre de representations d'une permutation comme produit de deux cycles de longueurs donnees , 1980, Discret. Math..

[5] Victor K.-W. Wei,et al. Decomposing a Permutation into Two Large Cycles: An Enumeration , 1980, SIAM J. Algebraic Discret. Methods.

[6] David W. Walkup,et al. How many ways can a permutation be factored into two n-cycles? , 1979, Discret. Math..

[7] David M. Jackson. Counting semiregular permutations which are products of a full cycle and an involution , 1988 .

[8] D. Jackson. Counting cycles in permutations by group characters, with an application to a topological problem , 1987 .

[9] D. Jackson,et al. A character-theoretic approach to embeddings of rooted maps in an orientable surface of given genus , 1990 .

[10] W. T. Tutte,et al. The Number of Planted Plane Trees with a Given Partition , 1964 .