McKay trees

Aizenbud, Avraham; Entova-Aizenbud, Inna

doi:10.5802/alco.270

McKay trees

Aizenbud, Avraham ¹ ; Entova-Aizenbud, Inna ²

¹ Department of Mathematics, Weizmann Institute of Science, Rehovot, Israel
² Department of Mathematics, Ben Gurion University of the Negev, Beer-Sheva, Israel

Algebraic Combinatorics, Tome 6 (2023) no. 2, pp. 513-531

Résumé

Given a finite group $G$ and its representation $ρ$ , the corresponding McKay graph is a graph $Γ (G, ρ)$ whose vertices are the irreducible representations of $G$ ; the number of edges between two vertices $π, τ$ of $Γ (G, ρ)$ is $d i m {Hom}_{G} (π \otimes ρ, τ)$ . The collection of all McKay graphs for a given group $G$ encodes, in a sense, its character table. Such graphs were also used by McKay to provide a bijection between the finite subgroups of $S U (2)$ and the affine Dynkin diagrams of types $A, D, E$ , the bijection given by considering the appropriate McKay graphs.

In this paper, we classify all (undirected) trees which are McKay graphs of finite groups and describe the corresponding pairs $(G, ρ)$ ; this classification turns out to be very concise.

Moreover, we give a partial classification of McKay graphs which are forests, and construct some non-trivial examples of such forests.

Reçu le : 2021-12-19
Accepté le : 2022-09-19
Publié le : 2023-05-03

DOI : 10.5802/alco.270

Classification : 20C15
Keywords: Representation theory, groups, McKay graphs

Affiliations des auteurs :

Aizenbud, Avraham ¹ ; Entova-Aizenbud, Inna ²

¹ Department of Mathematics, Weizmann Institute of Science, Rehovot, Israel
² Department of Mathematics, Ben Gurion University of the Negev, Beer-Sheva, Israel

Licence :

CC-BY 4.0

Droits d'auteur : Les auteurs conservent leurs droits

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     title = {McKay trees},
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     pages = {513--531},
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     publisher = {The Combinatorics Consortium},
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%A Entova-Aizenbud, Inna
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Aizenbud, Avraham; Entova-Aizenbud, Inna. McKay trees. Algebraic Combinatorics, Tome 6 (2023) no. 2, pp. 513-531. doi: 10.5802/alco.270

Bibliographie
Cité par

[1] Aschbacher, M. Finite group theory, Cambridge Studies in Advanced Mathematics, 10, Cambridge University Press, Cambridge, 2000, xii+304 pages | DOI | MR

[2] Browne, Hazel Connectivity properties of McKay quivers, Bull. Aust. Math. Soc., Volume 103 (2021) no. 2, pp. 182-194 | Zbl | MR | DOI

[3] Diaconis, Persi Threads through group theory, Character theory of finite groups (Contemp. Math.), Volume 524, Amer. Math. Soc., Providence, RI, 2010, pp. 33-47 | Zbl | MR | DOI

[4] McKay, John Graphs, singularities, and finite groups, The Santa Cruz Conference on Finite Groups (Univ. California, Santa Cruz, Calif., 1979) (Proc. Sympos. Pure Math.), Volume 37, Amer. Math. Soc., Providence, R.I., 1980, pp. 183-186 | Zbl | DOI | MR

[5] Smith, John H. Some properties of the spectrum of a graph, Combinatorial Structures and their Applications (Proc. Calgary Internat. Conf., Calgary, Alta., 1969), Gordon and Breach, New York (1970), pp. 403-406 | Zbl | MR

[6] Steinberg, Robert Finite subgroups of ${SU}_{2}$ , Dynkin diagrams and affine Coxeter elements, Pacific J. Math., Volume 118 (1985) no. 2, pp. 587-598 | Zbl | DOI | MR

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