Restricted lie (super)algebras, central extensions of non-associative algebras and some tapas

  1. Páez Guillán, María Pilar
Dirixida por:
  1. Manuel Ladra González Director
  2. Ivan Kaygorodov Co-director

Universidade de defensa: Universidade de Santiago de Compostela

Fecha de defensa: 20 de decembro de 2021

Tribunal:
  1. Consuelo Martínez López Presidente/a
  2. Alberto Carlos Elduque Palomo Secretario/a
  3. David A. Towers Vogal
Departamento:
  1. Departamento de Matemáticas

Tipo: Tese

Resumo

The general framework of this dissertation is the theory of non-associative algebras. We tackle diverse problems regarding restricted Lie algebras and superalgebras, central extensions of different classes of algebras and crossed modules of Lie superalgebras. Namely, we study the relationships between the structural properties of a restricted Lie algebra and those of its lattice of restricted subalgebras; we define a non-abelian tensor product for restricted Lie superalgebras and for graded ideal crossed submodules of a crossed module of Lie superalgebras, and explore their properties from structural, categorical and homological points of view; we employ central extensions to classify nilpotent bicommutative algebras; and we compute central extensions of the associative null-filiform algebras and of axial algebras. Also, we include a final chapter devoted to compare the two main methods (Rabinowitsch's trick and saturation) to introduce negative conditions in the standard procedures of the theory of automated proving and discovery.