Classification of finite irreducible conformal modules over N=2 Lie conformal superalgebras of Block type

Abstract

We introduce the N=2 Lie conformal superalgebras K(p) of Block type, and classify their finite irreducible conformal modules for any nonzero parameter p. where p is a nonzero complex number. In particular, we show that such a conformal module admits a nontrivial extension of a finite conformal module M over K2 if p=-1 and M has rank (2+2), where K2 is an N=2 conformal subalgebra of K(p). As a byproduct, we obtain the classification of finite irreducible conformal modules over a series of finite Lie conformal superalgebras k(n) for n1. Composition factors of all the involved reducible conformal modules are also determined.