Branching integrals and Casselman phenomenon
Abstract
Let G be a real semisimple Lie group, K its maximal complex subgroup, and GC its complexification. It is known that all the K-finite matrix elements on G admit holomorphic continuation to branching functions on GC having singularities at the a prescribed divisor. We propose a geometric explanation of this phenomenon. The note also contsins a general survey of holomorphic continuations of infinite-dimensional representations.
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