References
= Compact projective Planes, see Salzmann, H. et al.
Bödi, R. On the dimensions of automorphism groups of eight-dimensional ternary fields, II, Geom. Dedicata 53, 201-216.
Grundhöfer, T. — Salzmann, H. Locally compact double loops and ternary fields, In: O. Chein, H. Pflugfelder, J. Smith (eds.), Quasigroups and loops: theory and applications, Berlin: Heldermann, Chap. XI, pp. 313-355.
Mimura, M. Homotopy theory of Lie groups, In: James, I. M. (ed.), Handbook of algebraic topology, Amsterdam: North-Holland, Chap. 19, 951 - 991.
Priwitzer, B. Large semisimple groups on 16-dimensional compact projective planes are almost simple, Arch. Math. 68, 430 - 440.
Priwitzer, B. Large almost simple groups acting on 16-dimensional compact projective planes, Monatsh. Math.
Priwitzer, B. — Salzmann, H. Large automorphism groups of 16-dimensional planes are Lie groups, J. Lie Theory 8, 83-93.
Salzmann, H. Compact 16-dimensional projective planes with large collineation groups, Math. Ann. 261, 447-454.
Salzmann, H. Compact 16-dimensional projective planes with large collineation groups. II, Monatsh. Math. 95, 311-319.
Salzmann, H. Compact 16-dimensional projective planes with large collineation groups. III, Math. Z. 185, 185-190.
Salzmann, H. Characterization of 16-dimensional Hughes planes, Arch. Math.
Salzmann, H. — Betten, D. — Grundhöfer, T. — Hähl, H. — Löwen, R. — Stroppel, M. Compact projective planes, Berlin — New York: W. de Gruyter.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Salzmann, H. Compact 16-dimensional projective planes. Results. Math. 35, 192–196 (1999). https://doi.org/10.1007/BF03322032
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1007/BF03322032