Irreducible Jet modules for the vector field Lie algebra on S1× C

Abstract

For a commutative algebra A over C,denote g=Der(A). A module over the smash product A\# U(g) is called a jet g-module, where U(g) is the universal enveloping algebra of g.In the present paper, we study jet modules in the case of A=C[t1 1,t2].We show that A\#U(g) U(L), where D is the Weyl algebra C[t1 1,t2, ∂∂ t1,∂∂ t2], and L is a Lie subalgebra of A\# U(g) called the jet Lie algebra corresponding to g.Using a Lie algebra isomorphism θ:L → m1,0, where m1,0 is the subalgebra of vector fields vanishing at the point (1,0), we show that any irreducible finite dimensional L-module is isomorphic to an irreducible gl2-module. As an application, we give tensor product realizations of irreducible jet modules over g with uniformly bounded weight spaces.