Complete Sets of Functions on Homogeneous Spaces with Compact Stabilizers

Lie algebras for systems with mixed spectra. I. The scattering Pöschl–Teller potential, The U n,1 and IUn Representation Matrix Elements, The algebra and group deformations Im [SO(n)⊗SO(m)⇒SO(n,m), Im [U(n)⊗U(m)]⇒U(n,m), and Im [Sp(n)⊗Sp(m)]⇒Sp(n,m) for 1⩽m⩽n], Coset symmetrization operators, Spherical geometry, Zernike’s separability, and interbasis expansion coefficients, Zernike System Stems from Free Motion on the 3-Sphere, Deformations of inhomogeneous classical Lie algebras to the algebras of the linear groups, The group chain S On,1⊃S O1,1⊗S On−1, a complete solution to the ``missing label problem

• Discrete degenerate representations of non-compact unitary groups
• A classification of the unitary irreducible representations of \(SO_ 0 (N,1)\)
• A classification of the unitary irreducible representations of \(\mathrm{SU}(N,1)\)
• Harmonic analysis on the Poincaré group
• On the Representations of the Semisimple Lie Groups. I. The Explicit Construction of Invariants for the Unimodular Unitary Group in N Dimensions
• Continuous Degenerate Representations of Noncompact Rotation Groups. II
• Lowering and Raising Operators for the Orthogonal Group in the Chain O(n) ⊃ O(n − 1) ⊃ … , and their Graphs
• Decomposition of the Unitary Irreducible Representations of the Group SL(2C) Restricted to the Subgroup SU(1, 1)
• Class of Representations of the IU(n) and IO(n) Algebras and Respective Deformations to U(n, 1), O(n, 1)
• Finite Transformations of SU3
• Degenerate Representations of the Symplectic Groups II. The Noncompact Group Sp(p, q)
• Wavefunctions on Homogeneous Spaces
• Irreducible representations of the ‘unitary symmetry’ group