References
- [Brackx et al. 82] Brackx, F., Delanghe, R., Sommen, F., “Clifford Analysis,” Research Notes in Mathematics, London: Pitman, 1982.
- [Brackx et al. 11a] Brackx, F., Eelbode, D., Van de Voorde, L., “The Polynomial Null Solutions of a Higher Spin Dirac Operator in Two Vector Variables,” Adv. Appl. Cliff. Alg. 21: 3 (2011), 455–476.
- [Brackx et al. 11b] Brackx, F., Eelbode, D., Van de Voorde, L., “Higher Spin Dirac Pperators Between Spaces of Simplicial Monogenics in Two Vector Variables,” J. Math. Phys. Anal. Geom. 14 (2011), 1–20.
- [Branson 97] Branson, T., “Stein-Weiss Operators and Ellipticity,” J. Funct. Anal. 151: 2 (1997), 334–383.
- [Bureš et al. 01] Bureš, J., Sommen, F., Souček, V., Van Lancker, P., “Rarita-Schwinger Type Operators in Clifford Analysis,” Journal of Funct. Anal. 185, 425–456.
- [Bureš et al. 01] Bureš, J., Sommen, F., Souček, V., Van Lancker, P., “Symmetric Analogues of Rarita-Schwinger Equations,” Ann. Glob. Anal. Geom. 21: 3 (2001), 215–240.
- [Constales et al. 01] Constales, D., Sommen, F., Van Lancker, P., “Models for Irreducible Representations of Spin(m),” Adv. Appl. Clifford Algebras 11: S1 (2001), 271–289.
- [De Schepper et al. 10] De Schepper, H., Eelbode, D., Raeymaekers, T., “On a Special Type of Solutions for Arbitrary Higher Spin Dirac Operators,” J. Phys. A: Math. Theor. 43: 32 (2010), 1–13.
- [De Schepper et al. 14] De Schepper, H., Eelbode, D., Raeymaekers, T., “Twisted Higher Spin Dirac Operators,” Compl. Anal. Oper. Theory 8 (2014), 428–447.
- [Delanghe et al. 92] Delanghe, R., Sommen, F., Souček, V., “Clifford Analysis and Spinor Valued Functions,” Kluwer Academic Publishers, Dordrecht, 1992.
- [Eelbode and Raeymaekers 15] Eelbode, D., Raeymaekers, T., “Construction of Higher Spin Operators Using Transvector Algebras,” J. Math. Phys., under revision.
- [Eelbode and Raeymaekers 12] Eelbode, D., Smid, D., “Factorization of Laplace Operators on Higher Spin Representations,” Compl. Anal. Oper. Theory 6 (2012), 1011–1023.
- [Fegan 76] Fegan, H. D., “Conformally Invariant First Order Differential Operators,” Quart. J. Math. 27 (1976), 513–538.
- [Fulton and Harris 91] Fulton, W., Harris, J., Representation Theory: a First Course, Springer-Verlag, New York, 1991.
- [Gilbert and Murray 91] Gilbert, J., Murray, M.A.M., Clifford Algebras and Dirac Operators In Harmonic Analysis, Cambridge University Press, Cambridge, 1991.
- [Guerlebeck and Sprossig 98] Guerlebeck, K., Sprossig, W., Quaternionic and Clifford Calculus for Physicists and Engineers, Wiley, 1998.
- [Howe 89a] Howe, R., “Transcending Classical Invariant Theory,” J. Amer. Math. Soc. 2: 3 (1989), 535–552.
- [Howe 89b] Howe, R., “Remarks on Classical Invariant Theory,” Trans. Amer. Math. Soc. 313: 2 (1989), 539–570.
- [Humphreys 72] Humphreys, J., Introduction to Lie Slgebra and Representation Theory, Springer-Verlag, New York, 1972.
- [Klimyk 82] Klimyk, A. U., “Infinitesimal Operators for Representations of Complex Lie Groups and Clebsch-Gordan Coefficientsfor Compact Groups,” J. Phys. A: Math. Gen 15 (1982), 3009–3023.
- [Maple] Maple 17, Maplesoft, A Division of Waterloo Maple Inc., Waterloo, Ontario.
- [Molev 07] Molev, A.I., “Yangians and Classical Lie Algebras,” Mathematical Surveys and Monographs 143, AMS Bookstore (2007).
- [Rarita and Schwinger 41] Rarita, W., Schwinger, J., “On a Theory of Particles with Half-Integer Spin,” Phys. Rev. 60 (1941), 61.
- [Slovak 93] Slovak, J., “Natural Operators on Conformal Manifolds,” Masaryk University Dissertation (Brno, 1993).
- [Stein and Weiss 68] Stein, E.W., Weiss, G., “Generalization of the Cauchy-Riemann Equations and Representations of the Rotation Group,” Amer. J. Math. 90 (1968), 163–196.
- [Tolstoy 85] Tolstoy, V.N., “Extremal Projections for Reductive Classical Lie Superalgebras with a Non-Degenerate Generalised Killing Form,” Russ. Math. Surv. 40, 241–242, 1985.
- [Zhelobenko 85] Zhelobenko, D.P., “Transvector Algebras in Representation Theory and Dynamic Symmetry,” Group Theoretical Methods in Physics: Proceedings of the Third Yurmala Seminar 1, 1985.