Cartanification of contragredient Lie superalgebras

Abstract

Let B be a Z-graded Lie superalgebra equipped with an invariant Z2-symmetric homogeneous bilinear form and containing a grading element. Its local part (in the terminology of Kac) B-1 B0 B1 gives rise to another Z-graded Lie superalgebra, recently constructed in arXiv:2207.12417, that we here denote BW and call the cartanification of BW, since it is of Cartan type in the cases where it happens to finite-dimensional. In cases where B is given by a generalised Cartan matrix, we compare BW to the tensor hierarchy algebra W constructed from the same generalised Cartan matrix by a modification of the generators and relations. We generalise this construction and give conditions under which W and BW are isomorphic, proving a conjecture in arXiv:2207.12417. We expect that the algebras with restricted associativity underlying the cartanifications will be useful in applications of tensor hierarchy algebras to the field of extended geometry in physics.