On Lie algebras associated with modules over polynomial rings

Abstract

Let K be an algebraically closed field of characteristic zero. Let V be a module over the polynomial ring K[x,y]. The actions of x and y determine linear operators P and Q on V as a vector space over K. Define the Lie algebra LV= K P,Q V as the semidirect product of two abelian Lie algebras with the natural action of K P,Q on V. We show that if K[x,y]-modules V and W are isomorphic or weakly isomorphic, then the corresponding associated Lie algebras LV and LW are isomorphic. The converse is not true: we construct two K[x,y]-modules V and W of dimension 4 that are not weakly isomorphic but their associated Lie algebras are isomorphic. We characterize such pairs of K[x, y]-modules of arbitrary dimension. We prove that indecomposable modules V and W with V= W≥ 7 are weakly isomorphic if and only if their associated Lie algebras LV and LW are isomorphic.