A class of graded conformal algebras which is induced by Heisenberg-Virasoro conformal algebra

Abstract

In this paper, we obtain a class of Z-graded conformal algebras which is induced by Heisenberg-Virasoro conformal algebra. More precisely, we classify Z-graded conformal algebras A = ∞i=-1Ai satisfying the following conditions, (C1) A0 is the Heisenberg-Virasoro conformal algebra; C2) Each Ai for i∈Z-1* is an A0-module of rank one; (C3) [X-1λ Xi]≠ 0 for i 0, where Xi is any one of C[∂]-generators of Ai for i∈ Z -1. Further, we prove that all finite nontrivial irreducible modules of these algebras under some special conditions are free of rank one as a C[∂]-module. The conformal derivations of this class of graded Lie conformal algebras are also determined.