References
K. Burns andR. Spatzier, On topological Tits buildings and their classification. Publ. IHES65, 5–34 (1987).
T. Grundhöfer andN. Knarr, Topology in generalized quadrangles. Topology Appl.34, 139–152 (1990).
T. Grundhöfer, N. Knarr andL. Kramer, Flag-homogeneous compact connected polygons. Geom. Dedicata55, 95–114 (1995).
T. Grundhöfer andH. van Maldeghem, Topological polygons and affine buildings of rank three. Atti Sem. Mat. Fis. Univ. Modena38, 459–474 (1990).
L. Kramer, Compact Polygons. Doctoral dissertation. Tübingen 1994.
M. Stroppel, Lie theory for non-Lie groups. J. Lie Theory4, 257–284 (1995).
B. Stroppel andM. Stroppel, Connected orbits in topological generalized quadrangles. Preprint Nr. 1730, Fachbereich Mathematik der Technischen Hochschule, Darmstadt 1995.
E. van Kämpen, The structure of a compact connected group. Amer. J. Math.57, 301–308 (1935).
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Stroppel, B., Stroppel, M. The automorphism group of a compact generalized quadrangle has finite dimension. Arch. Math 66, 77–79 (1996). https://doi.org/10.1007/BF01323985
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DOI: https://doi.org/10.1007/BF01323985