Let (pi; H) be a unitary representation of a locally compact group G. A com- mutative subalgebra A of B(H) is called inductive when pi(g)A pi(g^(-1)) = A for all g. The classification of maximal inductive algebras sheds light on the possible realizations of on function spaces. In this paper we deal with the automorphism group of a locally finite homogeneous tree and its principal series spherical representations. We show that for some exceptional representations there exists just one inductive algebra besides those known. Finally, we generalize the main results to the subgroup of even automorphisms of the tree.
Even Automorphisms of Trees and Inductive Algebras / Stegel, Giovanni. - In: INTERNATIONAL JOURNAL OF PURE AND APPLIED MATHEMATICS. - ISSN 1311-8080. - 29:(2006), pp. 521-552.
Even Automorphisms of Trees and Inductive Algebras
STEGEL, Giovanni
2006-01-01
Abstract
Let (pi; H) be a unitary representation of a locally compact group G. A com- mutative subalgebra A of B(H) is called inductive when pi(g)A pi(g^(-1)) = A for all g. The classification of maximal inductive algebras sheds light on the possible realizations of on function spaces. In this paper we deal with the automorphism group of a locally finite homogeneous tree and its principal series spherical representations. We show that for some exceptional representations there exists just one inductive algebra besides those known. Finally, we generalize the main results to the subgroup of even automorphisms of the tree.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
