PGL2(Qp)-orbit closures on a p-adic homogeneous space of infinite volume
Abstract
Let K be an unramified quadratic extension of Qp for a fixed p>2. Projective general linear groups G=PGL2(K) and H=PGL2(Qp) act transitively on Bruhat-Tits trees TG and TH, respectively. We identify G/H with the set of H-subtrees G.TH. Let be a Schottky subgroup such that TG is infinite volume and has an additional condition named high-branchedness, and let be its limit set. We classify -orbits in G/H. Let C=gCH∈ G/H. As a generalization of Ratner's theorem, if gC.TH meets the convex core of TG, then the -orbit of C is either dense or closed in C=\g H: ∂(g.TH)≠\.
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