Symmetry Breaking Differential Operators for Tensor Products of Spinorial Representations

Abstract

Let S be a Clifford module for the complexified Clifford algebra C( Rn), S' its dual, and ' be the corresponding representations of the spin group Spin(n). The group G= Spin(1,n+1) is a (twofold) covering of the conformal group of Rn. For λ, μ∈ C, let π, λ (resp. π',μ) be the spinorial representation of G realized on a (subspace of) C∞( Rn, S) (resp. C∞( Rn, S')). For 0≤ k≤ n and m∈ N, we construct a symmetry breaking differential operator Bk;λ,μ(m) from C∞( Rn × Rn,S\,\, S') into C∞( Rn, *k( Rn) C) which intertwines the representations π, λ π',μ and πτ*k,λ+μ+2m, where τ*k is the representation of Spin(n) on the space *k( Rn) C of complex-valued alternating k-forms on Rn.