| last update February 1999 | to survey |
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[vBt] Bon, J. van, Affine distance-transitive groups, Thesis, University of Utrecht, 1990.
[vBp] Bon, J. van, Affine distance-transitive groups,, Proc. London Math. Soc., (67) (1993) 1-52.
[vBMP] Bon, J. van, Affine distance-transitive graphs with quadratic forms, Math. Proc. Cambridge Phil. Soc., (112) (1992) 507-517.
[vBs] Bon, J. van, A strategy to classify affine distance-transitive graphs, informal texscript, 1994-1996.
[vBCe] Bon, J. van, A.M. Cohen Affine Distance-Transitive Graphs and group of exceptional Lie type, preliminary preprint, 1997.
[vBCl] Bon, J. van, A.M. Cohen, Linear groups and distance-transitive graphs, European J. Comb., (10) (1989)394-411
[vBCP] Bon, J. van, A.M. Cohen, Prospective classification of distance-transitive graphs, pp. 25-38 in: Proceedings of the Combinatorics 1988 conference at Ravello, (eds. A. Barlotti et al.), Mediterranean Press, Commenda di Rende, Italy.
[vBIS1] Bon, J. van, N. Inglis, J. Saxl, Classical groups, multiplicity freeness, in preparation, 1999.
[vBIS2] Bon, J. van, N. Inglis, J. Saxl, Classical distance-transitive groups, in preparation, quoted in [ILLSS], 1999.
[vBIS] Bon, J. van, A. Ivanov, J. Saxl, Sporadic affine distance-transitive groups, preprint, 1997.
[CI] Cohen, A.M., A.A. Ivanov, Affine Distance-Transitive Groups of Dimension 1, preprint, 1997.
[CLS] Cohen, A.M., M. Liebeck, J. Saxl, Distance-transitive graphs with automorphism group of exceptional Lie type, (quoted in [La]), to appear??
[CMS] Cohen, A.M., K. Magaard, S. Shpectorov, Affine Distance-Transitive Graphs: The Cross Characteristic Case, European J. Comb. 20 (1999) 351-373.
[I] Inglis, ********, Sp2n on O2n+- in char 2,**** Comm. Algebra (****} (****1995) *****3379-3427.
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[ILLSS] Ivanov A. A., S.A. Linton, K. Lux, J. Saxl, L.H. Soicher, Distance-transitive representations of the sporadic groups, Comm. Algebra (23) (1995) 3379-3427.
[I1] Ivanov, A. A., Distance-transitive representations of the symmetric groups, J. Combinatorial Th. (B41) (1986) 255-274.
[I2] Ivanov, A. A., Distance-transitive graphs and their classification, pp.\ 283-378 in ``Investigations in Algebraic Theory of Combinatorial Objects'', I.A. Farad\c{z}ev, A.A. Ivanov, M.H. Klin, A.J. Woldar (eds.), Math. and its Appl., vol. 84, Kluwer Academic Publishers, Dordrecht, 1994.
[KL] Kleidman, P., M. Liebeck, The subgroup structure of the finite classical groups, Cambridge Univ. Press, 1990.
[La] Lawther, R., Some (almost) multiplicity-free coset actions, pp. 292-310 in ``Groups, Combinatorics and Geometry'', ed. by M.W. Liebeck and J. Saxl, Cambridge University Press, LMS LNS 165, 1992.
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[Li] Liebeck, M., The affine permutation groups of rank three, Proc. LMS 54 (1987) 477-516.
[LP] Liebeck, M., Ch. Praeger, Affine distance-transitive groups with alternating or symmetric point stabilizer, European J. Comb. (13) (1992) 489-502.
[LPS] Liebeck, M., Ch. Praeger, J. Saxl, Distance-transitive graphs with symmetric and alternating automorphism group, Bull. Australian Math. Soc. (35) (1987) 1-25.
[L3] Liebeck, M., The affine permutation groups of rank 3, Proc. London Math. Soc. (54) (1987) 426-446.
[PSY] Praeger, C., J. Saxl, K. Yokoyama, Distance transitive graphs and finite simple groups, Proc. London Math. Soc. (55) (1987) 1-21.
[Si] Saxl, J., MF representations*** Proc of the Isle of Thorns conf. LMS, CUP, 1981.
[SZ] Seitz, G,. A. Zalesskii, On the minimal degrees of projective representations of finite Chevalley groups, II J. Algebra 158 (1993) 233-243.