Symmetric polynomials in Leibniz algebras and their inner automorphisms

ŞEHMUS FINDIK; ZEYNEP ÖZKURT

Symmetric polynomials in Leibniz algebras and their inner automorphisms

Authors: ŞEHMUS FINDIK, ZEYNEP ÖZKURT

Abstract: Let $L_n$ be the free metabelian Leibniz algebra generated by the set $X_n=\{x_1,\ldots,x_n\}$ over a field $K$ of characteristic zero. This is the free algebra of rank $n$ in the variety of solvable of class $2$ Leibniz algebras. We call an element $s(X_n)\in L_n$ symmetric if $s(x_{\sigma(1)},\ldots,x_{\sigma(n)})=s(x_1,\ldots,x_n)$ for each permutation $\sigma$ of $\{1,\ldots,n\}$ . The set $L_n^{S_n}$ of symmetric polynomials of $L_n$ is the algebra of invariants of the symmetric group $S_n$ . Let $K[X_n]$ be the usual polynomial algebra with indeterminates from $X_n$ . The description of the algebra $K[X_n]^{S_n}$ is well known, and the algebra $(L_n')^{S_n}$ in the commutator ideal $L_n'$ is a right $K[X_n]^{S_n}$ -module. We give explicit forms of elements of the $K[X_n]^{S_n}$ -module $(L_n')^{S_n}$ . Additionally, we determine the description of the group $\text{\rm Inn}(L_{n}^{S_n})$ of inner automorphisms of the algebra $L_n^{S_n}$ . The findings can be considered as a generalization of the recent results obtained for the free metabelian Lie algebra of rank $n$ .

Keywords: Leibniz algebras, metabelian identity, automorphisms, symmetric polynomials

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