On spherical unitary representations of groups of spheromorphisms of Bruhat--Tits trees

Abstract

Consider an infinite homogeneous tree Tn of valence n+1, its group Aut(Tn) of automorphisms, and the group Hie(Tn) of its spheromorphisms (hierarchomorphisms), i.~e., the group of homeomorphisms of the boundary of Tn that locally coincide with transformations defined by automorphisms. We show that the subgroup Aut(Tn) is spherical in Hie(Tn), i.~e., any irreducible unitary representation of Hie(Tn) contains at most one Aut(Tn)-fixed vector. We present a combinatorial description of the space of double cosets of Hie(Tn) with respect to Aut(Tn) and construct a 'new' family of spherical representations of Hie(Tn). We also show that the Thompson group has PSL(2,Z)-spherical unitary