Affiliation:
1. Yildiz Technical University, Istanbul, Turkey
Abstract
In mathematics and engineering, a manifold is a topological space that
locally resembles Euclidean space near each point. Defining the best metric
for these manifolds have several engineering and science implications from
controls to optimization for generalized inner product applications of Gram
Matrices that appear in these applications. These smooth geometric manifold
applications can be formalized by Lie Groups and their Lie Algebras on its
infinitesimal elements. Nilpotent matrices that are matrices with zero power
with left-invariant metric on Lie group with non-commutative properties
namely non-abelian nilsoliton metric Lie algebras will be the focus of this
article. In this study, we present an algorithm to classify eigenvalues of
nilsoliton derivations for 9-D non-abelian nilsoliton metric Lie algebras
with non-singular Gram matrices.
Publisher
National Library of Serbia
Subject
Renewable Energy, Sustainability and the Environment
Reference23 articles.
1. Olver, P. J. Applications of Lie Groups to Differential Equations, Springer, New York, USA, 1993
2. Ceballos, M., et al., Algorithm to Compute Minimal Matrix Representation of Nilpotent Lie Algebras, International Journal of Computer Mathematics, 97 (2020), 1-2, pp. 275-293
3. Beck, R., et al., Computing the Structure of a Lie Algebra, In Non Associative Rings and Algebras (eds. R. E. Beck and B. Kolman), Academic Press, New York, pp. 167-188, 1977
4. De Graaf, Willem A., Lie algebras, Theory and algorithms, Elsevier, Amsterdam, The Netherlands, 2000
5. De Graaf, Willem A., Calculating the Structure of Semisimple Lie Algebra, J. of Pure and Applied Algebra, 117-118 (1997), pp. 319-329