Simple modules over the superconformal algebra S(1,n)

Abstract

Let n≥ 2, and let S(1,n) be the Lie superalgebra of zero-superdivergence superderivations of C[t1]Λ(n). Its derived algebra S(1,n):=[S(1,n),S(1,n)] is well known as a superconformal algebra. In this paper, we first study Shen-Larsson modules over S(1,n). These modules, introduced by G. Shen and T. A. Larsson, are constructed from modules over the Weyl superalgebra K1,n and the special linear Lie superalgebra sl(1,n). We establish necessary and sufficient conditions for the simplicity of Shen-Larsson modules and investigate their simple subquotients in the non-simple case. Then as an application, building on the classification of simple cuspidal S(1,n)-modules by C. Martínez, O. Mathieu and E. Zelmanov, we obtain an explicit construction of all simple cuspidal modules over S(1,n).