The exceptional simple Lie group F4(-20), after J. Tits

Abstract

This is a semi-survey paper, where we start by advertising Tits' synthetic construction from Tits, of the hyperbolic plane H2(Cay) over the Cayley numbers Cay, and of its automorphism group which is the exceptional simple Lie group G=F4(-20). Let G=KAN be the Iwasawa decomposition. Our contributions are: a) Writing down explicitly the action of N on H2(Cay) in Tits'model, facing the lack of associativity of Cay. b) If MAN denotes the minimal parabolic subgroup of G, characterizing M geometrically.

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