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Automorphisms of certain trees. (English) Zbl 0492.20014


MSC:

20D20 Sylow subgroups, Sylow properties, \(\pi\)-groups, \(\pi\)-structure
05C25 Graphs and abstract algebra (groups, rings, fields, etc.)
05C05 Trees

Citations:

Zbl 0475.05043
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References:

[1] Goldschmidt, D.M.: Automorphisms of trivalent graphs. Ann. of Math.111, 377-406 (1980) · Zbl 0475.05043 · doi:10.2307/1971203
[2] Gorenstein, D.: Finite groups. New York: Harper and Row 1968 · Zbl 0185.05701
[3] Hayashi, M.: On the existence of a characteristic 2-subgroup of a finite special group. Preprint 1980
[4] Rowley, P.: Groups, trees and tracks. In: Proceedings of the St. Andrews Groups 81 Conference (to appear)
[5] Stellmacher, B.: On graphs with edge-transitive automorphism groups. Universität Bielefeld preprint, 1980 · Zbl 0556.20015
[6] Stroth, G.: Graphs with subconstituents containingSz(q) andL 2 (r). Freie Universität Berlin, preprint no. 114, 1981
[7] Stroth, G.: Kantentransitive Graphen and Gruppen vom Rang 2. Freie Universität Berlin, preprint no. 122, 1981
[8] Weiss, R.: Edge-symmetric graphs. Preprint · Zbl 0486.05033
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