A family of maximal subalgebras of the Lie algebra~Wn(K)

Abstract

Let K be an algebraically closed field of characteristic zero and Pn=K[x1,…,xn] the polynomial ring. Any K-derivation D on Pn is of the form D=Σi=1n fi(x1,…,xn)∂∂ xi , where fi∈ Pn. All such derivations form the Lie algebra Wn(K) over the field K. We prove that for s=1,…,n-1 the subalgebra ms(K)=\ Σi=1s fi∂∂ xi +Σj=s+1n gj∂∂ xj fi∈ Ps,\ gj∈ Pn \ is a maximal subalgebra of~Wn(K). The ideal Is=\Σj=s+1n gj∂∂ xj\ of ms(K) is isomorphic to the Lie algebra Ps Der(K[xs+1,…,xn]) and ms(K)/Is Ws(K). The Lie algebra Wn(K) is also the free module over the ring Pn. Therefore, for any set S⊂eq Wn(K) the rank rk(S) (over Pn) is defined. Some properties of maximal subalgebras of rank n in Wn(K) are pointed out.