论文信息 - Complete triangular structures and Lie algebras

Complete triangular structures and Lie algebras

In this paper, we study the families of n-dimensional Lie algebras associated with a combinatorial structure made up of n vertices and with its edges forming a complete simple, undirected graph. Moreover, some properties are characterized for these structures using Lie theory, giving some examples and representations. Furthermore, we also study the type of Lie algebras associated with them in order to get their classification. Finally, we also show an implementation of the algorithmic method used to associate Lie algebras with complete triangular structures.

Manuel Ceballos | Juan Núñez | Ángel F. Tenorio

[1] Francesco Iachello,et al. Lie Algebras and Applications , 2006 .

[2] L. Fernández,et al. Combinatorial structures associated with Lie algebras of finite dimension , 2004 .

[3] P. Olver. Applications of Lie Groups to Differential Equations , 1986 .

[4] V. Varadarajan. Lie groups, Lie algebras, and their representations , 1974 .

[5] P. M. Cohn. ALGEBRES DE LIE SEMI‐SIMPLES COMPLEXES , 1968 .

[6] Lie algebras associated with triangular configurations , 2005 .

[7] Basic Representations for Classical Affine Lie Algebras , 2000 .

[8] Frank Harary,et al. Graph Theory , 2016 .

[9] R. Carter. Lie Groups , 1970, Nature.