Module structure of the Lie algebra Wn(K) over sln(K)

Abstract

Let K be an algebraically closed field of characteristic zero, A = K[x1,…,xn] the polynomial ring, and let Wn( K) denote the Lie algebra of all K-derivations on A. The Lie algebra Wn := Wn( K) admits a natural grading Wn = i -1 W[i]n, where W[i]n consists of all homogeneous derivations whose coefficients are homogeneous polynomials of degree i+1 or zero. The component W[0]n is a subalgebra of Wn and is isomorphic to gln( K). Moreover, each Wn[i] for i -1 is a finite-dimensional module over Wn[0]. We prove that W[i]n,\; i 0 is a sum of two irreducible submodules W[i]n = Mi Ni, where Mi consists of all divergence-free derivations, and Ni consists of derivations that are polynomial multiples of the Euler derivation En = Σi=1n xi ∂∂ xi. As a consequence, we show that the standard grading is exact in certain sense, namely: [W[i]n, W[j]n] = W[i+j]n for all i,j, except when i = j = 0. We also address the question of when the subalgebra of Wn generated by Wn[-1] Wn[0], together with an additional element from Wn, equals the entire Lie algebra Wn.