- Balıkesir Üniversitesi Fen Bilimleri Enstitüsü Dergisi
- Volume:26 Issue:1
- Bases of fixed point subalgebras on nilpotent Leibniz algebras
Bases of fixed point subalgebras on nilpotent Leibniz algebras
Authors : Zeynep Yapti Özkurt
Pages : 272-278
Doi:10.25092/baunfbed.1332488
View : 36 | Download : 43
Publication Date : 2024-01-19
Article Type : Research Paper
Abstract :Let K be a field of characteristic zero, X={x_(1,) x_2,…,x_n} and R_m={r_(1,) ,…,r_m} be two sets of variables, F be the free left nitpotent Leibniz algebra generated by X, and K[R_m ] be the commutative polynomial algebra generated by R_m over the base field K. The fixed point subalgebra of an automorphism φ is the subalgebra of F consisting of elements that are invariant under the automorphism. In this work, we consider specific automorphisms of F and determine the fixed point subalgebras of these automorphisms. Then, we find bases of these fixed point subalgebras. In addition, we get generators of these subalgebras as a free K[R_m ] -module.Keywords : nilpotent Leibniz cebirleri, sabit nokta, otomorfizm