Spaces of analytic functions on a complex cone as carriers for the symmetric tensor representations of SO(n)

Abstract

We study the space P of all polynomial functions on the complex cone K_n={Z= (Z₁⋅⋅⋅Z_n) ε Cⁿ, Z²=Z²₁+ ⋅⋅⋅+Z²_n=0} (n=3,4,⋅⋅⋅). Its subspaces K^l (=K^l_n) of homogeneous polynomials of degree l (=0,1,2,⋅⋅⋅) provide a convenient realization of the carrier spaces for the symmetric tensor representations of the real orthogonal group SO(n). The multiplication operator Z_μ (μ=1,...,n) maps K^l into K^l+1. We define its adjoint as an interior differential operator on K_n which maps K^l+1 into K^l and transforms as an n‐vector. We show that the lowest order differential operator with this property is proportional to D_μ= (n/2−1+√∂) ∂_μ −(1/2) Z_μΔ. We define a scalar product in P with respect to which the operators Z_μ and D_μ are Hermitian adjoint to each other and consider the Hilbert space completion K_n of P with respect to this scalar product. The spaces K_n are imbedded for all n (=3,4,⋅⋅⋅) in the Fock type spaces B_n, studied earlier by Bargmann. The space K_n possesses a reproducing kernel that allows us to define a (unique) harmonic extension of every analytic function in K_n. It is shown that the spaces K₃ and K₄ can be imbedded isometrically in the Hilbert spaces B₂ and B₄ associated with the representations of SU(2) and SU(2) ×SU(2) [⊇SU(4)].