An explicit Plancherel formula for line bundles over the one-sheeted hyperboloid
Abstract
In this paper we consider G=SL(2,R) and H the subgroup of diagonal matrices. Then X=G/H is a unimodular homogeneous space which can be identified with the one-sheeted hyperboloid. For each unitary character of H we decompose the induced representations IndHG() into irreducible unitary representations, known as a Plancherel formula. This is done by studying explicit intertwining operators between IndHG() and principal series representations of G. These operators depends holomorphically on the induction parameters.
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