Large automorphism groups of 8-dimensional projective planes are Lie groups

Compact connected projective planes have been investigated extensively in the last 30 years, mostly by studying their automorphism groups. It is our aim here to remove the connectedness assumption in some general results of Salzmann [31] and H/ihl[14] on automorphism groups of compact projective pla

Compact connected topological planes of dimension d ~< 4 have been studied extensively, and rather conclusive results have been obtained. In particular, the point set P is homeomorphic to the real or complex projective plane, and the lines are one-or two-spheres respectively. Moreover, non-degenerat

The geometries of all plane sections of these sets P are the classical examples of topological circle planes. They are known as the real miquelian M6bius, Laguerre, and Minkowski plane, respectively. In the last two cases, there are also complex analogues. For any locally compact connected circle ge