Strong transitivity, Moufang's condition and the Howe--Moore property

Abstract

Firstly, we prove that every closed subgroup H of type-preserving automorphisms of a locally finite thick affine building of dimension ≥ 2 that acts strongly transitively on is Moufang. If moreover is irreducible and H is topologically simple, we show that H is the subgroup (k)+ of the k-rational points (k) of the isotropic simple algebraic group over a non-Archimedean local field k associated with . Secondly, we generalise the proof given in BM00b for the case of bi-regular trees to any locally finite thick affine building , and obtain that any topologically simple, closed, strongly transitive and type-preserving subgroup of () has the Howe--Moore property. This proof is different than the strategy used so far in the literature and does not relay on the polar decomposition KA+K, where K is a maximal compact subgroup, and the important fact that A+ is an abelian maximal sub-semi-group.