Contraction groups and the big cell for endomorphisms of Lie groups over local fields

Abstract

Let G be a Lie group over a totally disconnected local field and α be an analytic endomorphism of G. The contraction group of α ist the set of all x∈ G such that αn(x) e as n∞. Call sequence (x-n)n≥ 0 in G an α-regressive trajectory for x∈ G if α(x-n)=x-n+1 for all n≥ 1 and x0=x. The anti-contraction group of α is the set of all x∈ G admitting an α-regressive trajectory (x-n)n≥ 0 such that x-n e as n∞. The Levi subgroup is the set of all x∈ G whose α-orbit is relatively compact, and such that x admits an α-regressive trajectory (x-n)n≥ 0 such that \x-n n≥ 0\ is relatively compact. The big cell associated to α is the set of all all products xyz with x in the contraction group, y in the Levi subgroup and z in the anti-contraction group. Let π be the mapping from the cartesian product of the contraction group, Levi subgroup and anti-contraction group to which maps (x,y,z) to xyz. We show: is open in G and π is \'etale for suitable immersed Lie subgroup structures on the three subgroups just mentioned. Moreover, we study group-theoretic properties of contraction groups and anti-contraction groups.

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