Simple smooth modules over the superconformal current algebra

Abstract

In this paper, we classify simple smooth modules over the superconformal current algebra g. More precisely, we first classify simple smooth modules over the Heisenberg-Clifford algebra, and then prove that any simple smooth g-module is a tensor product of such modules for the super Virasoro algebra and the Heisenberg-Clifford algebra, or an induced module from a simple module over some finite-dimensional solvable Lie superalgebras. As a byproduct, we provide characterizations for both simple highest weight g-modules and simple Whittaker g-modules. Additionally, we present several examples of simple smooth g-modules that are not tensor product of modules over the super Virasoro algebra and the Heisenberg-Clifford algebra.