Representation theory of the symplectic groups. I
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Publication:3826772
DOI10.1063/1.528346zbMath0673.22011OpenAlexW1986011244WikidataQ60732518 ScholiaQ60732518MaRDI QIDQ3826772
Publication date: 1989
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/4feb318430a5d91665eee1de8f10d6d97f19be1d
Related Items (2)
Cites Work
- Lowering operators and the symplectic group
- A projection-based solution to the SP(2N) state labeling problem
- Multiplicity-free Wigner coefficients for semisimple Lie groups. I. The U(n) pattern calculus
- Multiplicity-free Wigner coefficients for semisimple Lie groups. II. A pattern calculus for O(n)
- The most degenerate irreducible representations of the symplectic group
- Missing label operators in the reduction Sp(2n) ↓Sp(2n−2)
- Infinitesimal operators for representations of complex Lie groups and Clebsch-Gordan coefficients for compact groups
- The state labeling problems for SO(N) in U(N) and U(M) in Sp(2M)
- Second Commutant Theorems in Enveloping Algebras
- On the matrix elements of the U(n) generators
- Mickelsson lowering operators for the symplectic group
- On the Representations of the Semisimple Lie Groups. II
- THE CLASSICAL GROUPS. SPECTRAL ANALYSIS OF THEIR FINITE-DIMENSIONAL REPRESENTATIONS
- Canonical Definition of Wigner Coefficients in Un
- On the Representations of the Semisimple Lie Groups. V. Some Explicit Wigner Operators for SU3
- Degenerate Representations of the Symplectic Groups. I. The Compact Group Sp(n)
- Finite-dimensional irreducible representations of the unitary and the full linear groups, and related special functions
- Characteristic Identities for Generators of GL(n), O(n) and Sp(n)
- The Boson Calculus for the Orthogonal and Symplectic Groups
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