Simple smooth modules over the Lie algebras of polynomial vector fields

Abstract

Let g:= Der(C[t1, t2,·s, tn]) and L:= Der(C[[t1, t2,·s, tn]]) be the Witt Lie algebras. Clearly, g is a proper subalegbra of L. Surprisingly, we prove that simple smooth modules over g are exactly the simple modules over L studied by Rodakov (no need to take completion). Then we find an easy and elementary way to classify all simple smooth modules over g. When the height V≥2 or n=1, any nontrivial simple smooth g-module V is isomorphic to an induced module from a simple smooth g≥0-module V(V). When V=1 and n≥2, any such module V is the unique simple quotient of the tensor module F(P0,M) for some simple n-module M, where P0 is a particular simple module over the Weyl algebra K+n. We further show that a simple g-module V is a smooth module if and only if the action of each of n particular vectors in g is locally finite on V.