A class of Z_2-graded Lie algebra and Lie superalgebra extensions of the pseudo-orthogonal algebra of a spacetime of arbitrary dimension and signature is investigated. They have the form g = g_0 + g_1, with g_0 = so(V) + W_0 and g_1 = W_1, where the algebra of generalized translations W = W_0 + W_1 is the maximal solvable ideal of g, W_0 is generated by W_1 and commutes with W. Choosing W_1 to be a spinorial so(V)-module (a sum of an arbitrary number of spinors and semispinors), we prove that W_0 consists of polyvectors, i.e. all the irreducible so(V)-submodules of W_0 are submodules of \Lambda V. We provide a classification of such Lie (super)algebras for all dimensions and signatures. The problem reduces to the classification of so(V)-invariant \Lambda^k V-valued bilinear forms on the spinor module S.

Publié le : 2003-11-13
Classification:  High Energy Physics - Theory,  Mathematical Physics,  Mathematics - Differential Geometry

@article{0311107,
     author = {Alekseevsky, Dmitri V. and Cort\'es, Vicente and Devchand, Chandrashekar and Van Proeyen, Antoine},
     title = {Polyvector Super-Poincare Algebras},
     journal = {arXiv},
     volume = {2003},
     number = {0},
     year = {2003},
     language = {en},
     url = {http://dml.mathdoc.fr/item/0311107}
}

Alekseevsky, Dmitri V.; Cortés, Vicente; Devchand, Chandrashekar; Van Proeyen, Antoine. Polyvector Super-Poincare Algebras. arXiv, Tome 2003 (2003) no. 0, . http://gdmltest.u-ga.fr/item/0311107/