The $ct$ transform on line bundles over compact Hermitian symmetric spaces


Abstract in English

In a previous article the second author together with A. Pasquale determined the spectrum of the $Cos^lambda$ transform on smooth functions on the Grassmann manifolds $G_{p,n+1}$. This article extends those results to line bundles over certain Grassmannians. In particular we define the $Cos^lambda$ transform on smooth sections of homogeneous line bundles over$G_{p,n+1}$ and show that it is an intertwining operator between generalized ($chi$-spherical) principal series representations induced from a maximal parabolic subgroup of $mathrm{SL} (n+1, mathbb{K})$. Then we use the spectrum generating method to determine the $K$-spectrum of the $Cos^lambda$ transform.

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