Quantization of generalized Virasoro-like algebras

In this paper, finite dimensional quotients of the q-Virasoro-like algebra are determined when q is a root of unity. As an application, finite dimensional irreducible modules over the q-Virasoro-like algebra are classified for any root q of unity.

Let F be a ÿeld of characteristic 0, not necessarily algebraically closed, and G be an additive subgroup of F. For any total order on G which is compatible with the group addition, and for any ċ; h ∈ F, a Verma module M ( ċ; h) over the generalized Virasoro algebra Vir[G] is deÿned. In the present p

We study the series of Lie algebras generalizing the Virasoro algebra introduced in [V. Yu, Ovsienko, C. Roger, Functional Anal. Appl. 30 (4) (1996)]. We show that the coadjoint representation of each of these Lie algebras has a natural geometrical interpretation by matrix differential operators gen