异常单李群F4(−20)，后为J. Tits

Q4 Mathematics Innovations in Incidence Geometry Pub Date : 2023-09-13 DOI:10.2140/iig.2023.20.599

Alain J. Valette

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

This is a semi-survey paper, where we start by advertising Tits' synthetic construction from \cite{Tits}, of the hyperbolic plane $H^2(Cay)$ over the Cayley numbers $Cay$, and of its automorphism group which is the exceptional simple Lie group $G=F_{4(-20)}$. Let $G=KAN$ be the Iwasawa decomposition. Our contributions are: a) Writing down explicitly the action of $N$ on $H^2(Cay)$ 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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