kw.\*:("Casimir operators")
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Tensor extension of the Poincaré algebraSOROKA, Dmitrij V; SOROKA, Vyacheslav A.Physics letters. Section B. 2005, Vol 607, Num 3-4, pp 302-305, issn 0370-2693, 4 p.Article
Intrinsic formulae for the Casimir operators of semidirect products of the exceptional Lie algebra G2 and a Heisenberg Lie algebraCAMPOAMOR-STURSBERG, Rutwig.Journal of physics. A, mathematical and general. 2004, Vol 37, Num 40, pp 9451-9466, issn 0305-4470, 16 p.Article
Casimir operators of the exceptional group F4 : the chain B4 ⊂ f4 ⊂ D13BINCER, A. M.Journal of physics. A, mathematical and general. 1994, Vol 27, Num 11, pp 3847-3856, issn 0305-4470Article
About the Casimir scaling hypothesisSEMAY, C.The European physical journal. A, Hadrons and nuclei. 2004, Vol 22, Num 3, pp 355-362, 8 p.Article
Casimir operators of the exceptional group G2BINCER, A. M; RIESSELMANN, K.Journal of mathematical physics. 1993, Vol 34, Num 12, pp 5935-5941, issn 0022-2488Article
On resolving the multiplicity of the branching rule GL(2k, C)↓Sp(2k, C)LEUNG, E. Y.Journal of physics. A, mathematical and general. 1994, Vol 27, Num 8, pp 2749-2760, issn 0305-4470Article
Casimir operators induced by the Maurer-Cartan equationsCAMPOAMOR-STURSBERG, Rutwig.Journal of physics. A, Mathematical and theoretical (Print). 2008, Vol 41, Num 36, issn 1751-8113, 365207.1-365207.16Article
Eigenvalues of Casimir invariants of Uq(gl(m/n))LINKS, J. R; ZHANG, R. B.Journal of mathematical physics. 1993, Vol 34, Num 12, pp 6016-6024, issn 0022-2488Article
Invariants of Lie algebras with fixed structure of nilradicalsBOYKO, Vyacheslav; PATERA, Jiri; POPOVYCH, Roman et al.Journal of physics. A, Mathematical and theoretical (Print). 2007, Vol 40, Num 1, pp 113-130, issn 1751-8113, 18 p.Article
A generalized action for (2 + 1)-dimensional Chern―Simons gravityDIAZ, J; FIERRO, O; IZAURIETA, F et al.Journal of physics. A, Mathematical and theoretical (Print). 2012, Vol 45, Num 25, issn 1751-8113, 255207.1-255207.14Article
Invariants of triangular Lie algebrasBOYKO, Vyacheslav; PATERA, Jiri; POPOVYCH, Roman et al.Journal of physics. A, Mathematical and theoretical (Print). 2007, Vol 40, Num 27, pp 7557-7572, issn 1751-8113, 16 p.Article
Explicit construction of the spin-4 Casimir operator in the coset model SO(5)1×SO(5)m/SO(5)1+mCHANGHYUN AHN.Journal of physics. A, mathematical and general. 1994, Vol 27, Num 1, pp 231-237, issn 0305-4470Article
Invariants of a semi-direct sum of Lie algebrasNDOGMO, J. C.Journal of physics. A, mathematical and general. 2004, Vol 37, Num 21, pp 5635-5647, issn 0305-4470, 13 p.Article
Virtual copies of semisimple Lie algebras in enveloping algebras of semidirect products and Casimir operatorsCAMPOAMOR-STURSBERG, R; LOW, S. G.Journal of physics. A, Mathematical and theoretical (Print). 2009, Vol 42, Num 6, issn 1751-8113, 065205.1-065205.18Article
On algebraic models of relativistic scatteringKERIMOV, G. A; VENTURA, A.Journal of physics. A, Mathematical and theoretical (Print). 2008, Vol 41, Num 39, issn 1751-8113, 395306.1-395306.11Article
Computation of invariants of Lie algebras by means of moving framesBOYKO, Vyacheslav; PATERA, Jiri; POPOVYCH, Roman et al.Journal of physics. A, mathematical and general. 2006, Vol 39, Num 20, pp 5749-5762, issn 0305-4470, 14 p.Article
A new matrix method for the Casimir operators of the Lie algebras wsp(N, R) and Isp(2N, R)CAMPOAMOR-STURSBERG, Rutwig.Journal of physics. A, mathematical and general. 2005, Vol 38, Num 19, pp 4187-4208, issn 0305-4470, 22 p.Article
Quantized affine Lie algebras and diagonalization of braid generatorsGOULD, M. D; ZHANG, Y.-Z.letters in mathematical physics. 1994, Vol 30, Num 4, pp 267-277, issn 0377-9017Article
The SU(N) Wilson loop average in two dimensionsKARJALAINEN, E.Nuclear physics. B. 1994, Vol 413, Num 1-2, pp 84-102, issn 0550-3213Article
Internal labelling problem: an algorithmic procedureCAMPOAMOR-STURSBERG, Rutwig.Journal of physics. A, Mathematical and theoretical (Print). 2011, Vol 44, Num 2, issn 1751-8113, 025204.1-025204.18Article
Determinantal formulae for the Casimir operators of inhomogeneous Lie algebrasCAMPOAMOR-STURSBERG, Rutwig.Journal of physics. A, mathematical and general. 2006, Vol 39, Num 10, pp 2325-2337, issn 0305-4470, 13 p.Article
The quantum Casimir operators of Uq(gln) and their eigenvaluesJUNBO LI.Journal of physics. A, Mathematical and theoretical (Print). 2010, Vol 43, Num 34, issn 1751-8113, 345202.1-345202.9Article
Internal labelling operators and contractions of Lie algebrasCAMPOAMOR-STURSBERG, R.Journal of physics. A, Mathematical and theoretical (Print). 2007, Vol 40, Num 49, pp 14773-14790, issn 1751-8113, 18 p.Article
The structure of the invariants of perfect Lie algebras IICAMPOAMOR-STURSBERG, Rutwig.Journal of physics. A, mathematical and general. 2004, Vol 37, Num 11, pp 3627-3643, issn 0305-4470, 17 p.Article
A propos de parasuperalgèbres de Poincaré et de leurs opérateurs de Casimir = On Poincaré parasuperalgebras and their Casimir operatorsNDIMUBANDI, J.Bulletin de la Société Royale des Sciences de Liège. 1993, Vol 62, Num 5-6, pp 425-437, issn 0037-9565Article