Inner automorphisms of Lie algebras of symmetric polynomials

Abstract

Let Ln be the free Lie algebra, Fn be the free metabelian Lie algebra, and Ln,c be the free metabelian nilpotent of class c Lie algebra of rank n generated by x1,…,xn over a field K of characteristic zero. We call a polynomial p(Xn) symmetric in these Lie algebras if p(x1,…,xn)=p(xπ(1),…,xπ(n)) for each element π of the symmetric group Sn. The sets LnSn, FnSn, and Ln,cSn of symmetric polynomials coincide with the algebras of invariants of the group Sn in Ln, Fn, and Ln,c, respectively. We determine the groups Inn(FnSn) and Inn(Ln,cSn) of inner automorphisms of the algebras FnSn and Ln,cSn, respectively. In particular, we obtain the descriptions of the groups Aut(L2S2), Aut(F2S2), and Aut(L2,cS2) of all automorphisms of the algebras L2S2, F2S2, and L2,cS2, respectively.