The solenoidal Heisenberg Virasoro algebra and its simple weight modules

Abstract

Let An=C[ti1,~1≤ i≤ n] and W(n)μ=Andμ the solenoidal Lie algebra introduced by Y.Billig and V.Futorny in BiFu2, where μ=(μ1,…,μn)∈Cn is a generic vector and dμ=Σi=1nμiti∂∂ ti. We consider the semi-direct product Lie algebra WA(n)μ:=W(n)μ An. In the first part, We prove that WA(n)μ has a unique three-dimensional universal central extension. In fact we construct a higher rank Heisenberg-Virasoro algebra (see LiuGuo, LdZ). It will be denoted by HVir(n)μ and it will be called the solenoidal Heisenberg-Virasoro algebra. Then we will study Harish-Chandra modules of HVir(n)μ following LiuGuo. We will obtain two classes of Harich-Chandra modules: generalized highest weight modules(GHW modules) and intermediate series modules. Our results are particular cases of LiuGuo. In the end, we will construct HVir(n)μ Verma modules using the lexicographic order on Zn. In particular we give examples of irreducible weight modules which have infinite dimensional weight spaces.