On the group of spheromorphisms of the homogeneous non-locally finite tree

Abstract

Consider a tree T, all whose vertices have countable valence; its boundary is the Baire space B N; continued fractions expansions identify the set of irrational numbers R Q with B. Removing k edges from T we get a forest consisting of copies of T. A spheromorphism (or hierarchomorphism) of T is an isomorphisms of two such subforests considered as a transformation of T or of B. Denote the group of all spheromorphisms by Hier( T). We a show that the correspondence R Q B sends the Thompson group realized by piecewise PSL2( Z)-transformations to a subgroup of Hier( T). We construct some unitary representations of the group Hier( T), show that the group of automorphisms Aut( T) is spherical in Hier( T), and describe the train (enveloping category) of Hier( T).