Triples of involutions in PGL(2,q) and their incidence geometries

Abstract

For q = pn with p an odd prime, the projective linear group PGL(2,q) can be seen as the stabilizer of a conic O in a projective plane π = PG(2,q). In that setting, involutions of PGL(2,q) correspond bijectively to points of π not in O. Triples of involutions \ αP,αQ,αR \ of PGL(2,q) can then be seen also as triples of points \P,Q,R\ of π. We investigate the interplay between algebraic properties of the group H = αP,αQ,αR generated by three involutions and geometric properties of the triple of points \P,Q,R\. In particular, we show that the coset geometry = (H,(H0,H1,H2)), where H0 = αQ,αR , H1 = αP,αR and H2 = αP,αQ is a regular hypertope if and only if \P,Q,R\ is a strongly non self-polar triangle, a terminology we introduce. This entirely characterizes hypertopes of rank 3 with automorphism group a subgroup of PGL(2,q). As a corollary, we obtain the existence of hypertopes of rank 3 with non linear diagrams and with automorphism group PGL(2,q), for any q = pn with p an odd prime. We also study in more details the case where the triangle \P,Q,R\ is tangent to O.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…