Invariant theory of relatively free right-symmetric and Novikov algebras
From MaRDI portal
Publication:3380096
zbMATH Open1479.17003arXiv1607.06576MaRDI QIDQ3380096
Publication date: 27 September 2021
Abstract: Algebras with the polynomial identity (x,y,z)=(x,z,y), where (x,y,z)=x(yz)-(xy)z is the associator, are called right-symmetric. Novikov algebras are right-symmetric algebras satisfying additionally the polynomial identity x(yz)=y(xz). We consider the d-generated free right-symmetric algebra F(R) and the free Novikov algebra F(N) over a filed K of characteristic 0. The general linear group GL(K,d) with its canonical action on the d-dimensional vector space with basis the generators of F(R) and F(N) acts on F(R) and F(N) as a group of linear automorphisms. For a subgroup G of GL(K,d) we study the algebras of G-invariants in F(R) and F(N). For a large class of groups G we show that these algebras of invariants are never finitely generated. The same result holds for any subvariety of the variety R of right-symmetric algebras which contains the subvariety L of left-nilpotent of class 3 algebras in R.
Full work available at URL: https://arxiv.org/abs/1607.06576
Nonassociative algebras satisfying other identities (17A30) Automorphisms, derivations, other operators (nonassociative rings and algebras) (17A36) Free nonassociative algebras (17A50)
Related Items (1)
This page was built for publication: Invariant theory of relatively free right-symmetric and Novikov algebras
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q3380096)
