On compression of Bruhat-Tits buildings
Abstract
We obtain an analog of the compression of angles theorem in symmetric spaces for Bruhat--Tits buildings of the type A. More precisely, consider a p-adic linear space V and the set Lat(V) of all lattices in V. The complex distance in Lat(V) is a complete system of invariants of a pair of points of Lat(V) under the action of the complete linear group. An element of a Nazarov semigroup is a lattice in the duplicated linear space V V. We investigate behavior of the complex distance under the action of the Nazarov semigroup on the set Lat(V).
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