A bound on the degree of singular vectors for the exceptional Lie superalgebra E(5,10)

Abstract

We use the language of Lie pseudoalgebras to gain information about the representation theory of the simple infinite-dimensional linearly compact Lie superalgebra of exceptional type E(5,10). This technology allows us to prove that the degree of singular vectors in minimal Verma modules is ≤ 14. A few technical adjustments allow us to refine the bound, proving that the degree must always be ≤ 12 and it is actually, except for a finite number of cases, ≤ 10.