Covers of Bruhat-Tits trees
Abstract
Let G be a locally compact group and let G be a central extension that splits over a maximal compact subgroup K of G. We derive an explicit cocycle that lifts the natural action of G on the homogeneous space G/K to an action of G. As an application, for a non-Archimedean local field F, we construct a connected locally finite tree on which the metaplectic covers of GL2(F) act by automorphisms, providing a geometric analog of the Bruhat--Tits tree of GL2(F). Furthermore, under suitable transitivity assumptions, we prove that (G,K) is a Gelfand pair. Finally, we describe the associated parabolic and contraction subgroups with respect to G from the perspective of the geometry of the constructed tree.
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