Differential symmetry breaking operators from a line bundle to a vector bundle over real projective spaces
Abstract
In this paper we classify and construct differential symmetry breaking operators D from a line bundle over the real projective space RPn to a vector bundle over RPn-1. We further determine the factorization identities of D and the branching laws of the corresponding generalized Verma modules of sl(n+1,C). By utilizing the factorization identities, the SL(n,R)-representations realized on the image Im(D) are also investigated.
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