The Segal-Bargmann Transform on Compact Symmetric Spaces and their Direct Limits

Abstract

We study the Segal-Bargmann transform, or the heat transform, Ht for a compact symmetric space M=U/K. We prove that Ht is a unitary isomorphism Ht : L2(M) t (M) using representation theory and the restriction principle. We then show that the Segal-Bargmann transform behaves nicely under propagation of symmetric spaces. If \Mn=Un/Kn,n,m\n is a direct family of compact symmetric spaces such that Mm propagates Mn, m n, then this gives rise to direct families of Hilbert spaces \L2(Mn),γn,m\ and \t(Mn),δn,m\ such that Ht,m γn,m=δn,m Ht,n. We also consider similar commutative diagrams for the Kn-invariant case. These lead to isometric isomorphisms between the Hilbert spaces L2(Mn) H (MnC) as well as L2(Mn)Kn H (MnC)Kn.