Irreducible modules over the universal central extension of the planar Galilean conformal algebra

Abstract

In this paper, we study the representation theory of the universal central extension G of the infinite-dimensional Galilean conformal algebra, introduced by Bagchi-Gopakumar, in (2+1) dimensional space-time, which was named the planar Galilean conformal algebra by Aizawa. More precisely, we construct a family of Whittaker modules W_m,n over G while the necessary and sufficient conditions for these modules to be irreducible are given when m∈Z+, n∈N and m,n have the same parity. Moreover, the irreducible criteria of the tensor product modules (λ,η,σ,0) R, (λ,η,0,σ) R over G are obtained, where (λ,η,σ,0), (λ,η,0,σ) are U(h)-free modules of rank one over G and R is an irreducible restricted module over G. Also, the isomorphism classes of these tensor product modules are determined.