Proof of Kac and Rudakov's Conjecture on Generalized Verma Module over Lie Superalgebra E(5,10)

Abstract

The exceptional infinite-dimensional linearly compact simple Lie superalgebra E(5,10), which Kac believes, is the algebra of symmetries of the SU5 Grand Unified Model. In this paper, we give a proof of Kac and Rudakov's conjecture about the classification of all the degenerate generalized Verma module over E(5,10). Also, we work out all the nontrivial singular vectors degree by degree. It is a potential that the representation theory of E(5,10) will shed new light on various features of the the SU5 Grand unified model.