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On finite groups with the Cayley invariant property

Published online by Cambridge University Press:  17 April 2009

Cai Heng Li
Cai Heng Li
Affiliation:
Department of Mathematics, University of Western Australia, Nedlands WA 6907, Australia, email: [email protected]
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Abstract

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A finite group G is said to have the m-CI property if, for any two Cayley graphs Cay(G, S) and Cay(G, T) of valency m, Cay(G, S) ≅ Cay(G, T) implies Sσ = T for some automorphism σ of G. In this paper, we investigate finite groups with the m-CI property. We first construct groups with the 3-CI property but not with the 2-CI property, and then prove that a nonabelian simple group has the 3-CI property if and only if it is A5. Finally, for infinitely many values of m, we construct Frobenius groups with the m-CI property but not with the nontrivial k-CI property for any k < m.

Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 56 , Issue 2 , October 1997 , pp. 253 - 261
Copyright
Copyright © Australian Mathematical Society 1997

References

[1]Alspach, B. and Parsons, T.D., ‘Isomorphisms of circulant graphs and digraphs’, Discrete Math. 25 (1979), 97108.CrossRefGoogle Scholar
[2]Babai, L., ‘Isomorphism problem for a class of point-symmetric structures’, Acta Math. Acad. Sci. Hungar. 29 (1977), 329336.CrossRefGoogle Scholar
[3]Conway, J.H., Curtis, R.T., Norton, S.P., Parker, R.A. and Wilson, R.A., Atlas of finite groups (Clarendon Press, Oxford, 1985).Google Scholar
[4]Gross, F., ‘Conjugacy of odd order Hall subgroups.’, Bull. London Math. Soc 19 (1987), 311319.CrossRefGoogle Scholar
[5]Kleidman, P.B., ‘The maximal subgroups of the Chevalley groups G2(q) with q odd, of the Ree groups 2G 2(q), and their automorphism groups’, J. Algebra 117 (1988), 3071.CrossRefGoogle Scholar
[6]Li, C.H.. ‘Isomorphisms and classification of Cayley graphs of small valencies on finite abelian groups’, Australas. J. Combin 12 (1995), 314.Google Scholar
[7]Li, C.H., ‘The finite groups with the 2-DCI property’, Comm. Algebra 24 (1996), 17491757.Google Scholar
[8]Li, C.H., ‘Finite abelian groups with the m-DCI property’, Ars Combin. (to appear).Google Scholar
[9]Li, C.H., Isomorphisms of finite Cayley graphs, Ph.D. Thesis (The University of Western Australia, 1996).Google Scholar
[10]Li, C.H. and Praeger, C.E., ‘The finite simple groups with at most two fusion classes of every order’, Comm. Algebra 24 (1996), 36813704.CrossRefGoogle Scholar
[11]Li, C.H., Praeger, C.E. and Xu, M.Y., ‘On finite groups with the Cayley isomorphism property’, (preprint 1995).Google Scholar
[12]Muzychuk, M., ‘Ádám's conjecture is true in the square-free case’, J. Combin. Theory (A) 72 (1995), 118134.CrossRefGoogle Scholar
[13]Pálfy, P.P., Isomorphism problem for relational structures with a cyclic automorphism, European J. Combin 8 (1987), 3543.CrossRefGoogle Scholar
[14]Robinson, D.J.S., A course in the theory of groups (Springer-Verlag, Berlin, Heidelberg, New York, 1982).CrossRefGoogle Scholar
[15]Suzuki, M., Group theory I (Springer-Verlag, Berlin, Heidelberg, New York, 1986).Google Scholar
[16]Suzuki, M., Group theory II (Springer-Verlag, Berlin, Heidelberg, New York, 1986).CrossRefGoogle Scholar