Signed graphs and signed cycles of hyperoctahedral groups
Abstract
For a graph with edge ordering, a linear order on the edge set, we obtain a permutation of vertices by considering the edges as transpositions of endvertices. It is known from Dénes’ results that the permutation of a tree is a full cyclic for any edge ordering. As a corollary, Dénes counted up the number of representations of a full cyclic permutation by means of product of the minimal number of transpositions. Moreover, a graph with an edge ordering which the permutation is a full cyclic is characterized by graph embedding. In this article, we consider an analogy of these results for signed graphs and hyperoctahedral groups. We give a necessary and sufficient condition for a signed graph to have an edge ordering such that the permutation is an even (or odd) full cyclic. We show that the edge ordering of the signed tree with some loops always gives an even (or odd) full cyclic permutation and count up the number of representations of an odd full cyclic permutation by means of product of the minimal number of transpositions.
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PDFDOI: http://dx.doi.org/10.5614/ejgta.2023.11.2.7
References
A.V. Borovik and A. Borovik, Mirrors and Reflections, Springer New York, New York, NY, 2010.
R.W. Carter, Conjugacy classes in the Weyl group, Compositio Mathematica 25 (1972), 60.
G. Chapuy and C. Stump, Counting factorizations of Coxeter elements into products of reflections, Journal of the London Mathematical Society 90 (2014), no. 3, 919–939.
J.D´enes, The representation of a Permutation as the product of a minimal number of transpositions, and its connection with the theory of graphs, Publications of the Mathematical Institute of the Hungarian Academy of Sciences 4 (1959), 63–70.
J.E. Humphreys, Reflection Groups and Coxeter Groups, 1 ed., Cambridge University Press, June 1990.
A. Kerber, Representations of Permutation Groups I: Representations of wreath products and applications to the representation theory of symmetric and alternating groups, Lecture Notes in Mathematics, vol. 240, Springer Berlin Heidelberg, 1971.
A. Kerber, Representations of Permutation Groups II, Lecture Notes in Mathematics, vol. 495, Springer Berlin Heidelberg, 1975.
P. Moszkowski, A Solution to a Problem of D´enes: a Bijection Between Trees and Factorizations of Cyclic Permutations, European Journal of Combinatorics 10 (1989), no. 1, 13–16.
B. Pawlowski, Chromatic symmetric functions via the group algebra of Sn, Algebraic Combinatorics 5 (2022), no. 1, 1–20.
S. Tsujie and R. Uchiumi, Upper Embeddability of Graphs and Products of Transpositions Associated with Edges, December 2022, arXiv:2211.05422 [math].
A. Young, On Quantitative Substitutional Analysis 5, Proceedings of the London Mathematical Society s2-31 (1930), no. 1, 273–288.
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