Search

Your search keyword '"Daza-Garcia, Alberto"' showing total 8 results
Start Over Author "Daza-Garcia, Alberto"
8 results on '"Daza-Garcia, Alberto"'

1. Gradings on associative triple systems of the second kind

Author

Daza-Garcia, Alberto

Subjects
Mathematics - Rings and Algebras
Abstract

On this work we study associative triple systems of the second kind. We show that for simple triple systems the automorphism group scheme is isomorphic to the automorphism group scheme of the $3$-graded associative algebra with involution constructed by Loos. This result will allow us to prove our main result which is a complete classification up to isomorphism of the gradings of structurable algebras., Comment: 30 pages, some typos have been changed

Published
2024

2. Automorphisms, derivations and gradings of the split quartic Cayley algebra

Author

Blasco, Victor and Daza-Garcia, Alberto

Subjects
Mathematics - Rings and Algebras, 17A36
Abstract

The split quartic Cayley algebra is a structurable algebra which has been used to give constructions of Lie algebras of type D4. Here, we calculate its group of automorphisms, its algebra of derivations and its gradings., Comment: 9 pages

Published
2023

4. From octonions to composition superalgebras via tensor categories

Author

Daza-Garcia, Alberto, Elduque, Alberto, and Sayin, Umut

Subjects
Mathematics - Quantum Algebra, Mathematics - Rings and Algebras, 17A75
Abstract

The nontrivial unital composition superalgebras, of dimension 3 and 6, which exist only in characteristic 3, are obtained from the split Cayley algebra and its order 3 automorphisms, by means of the process of semisimplification of the symmetric tensor category of representations of the cyclic group of order 3. Connections with the extended Freudenthal Magic Square in characteristic 3, that contains some exceptional Lie superalgebras specific of this characteristic are discussed too. In the process, precise recipes to go from (nonassociative) algebras in this tensor category to the corresponding superalgebras are given., Comment: 21 pages. In the second version some details have been added and some typos corrected

Published
2022

5. Cross products, automorphisms, and gradings

Author

Daza-García, Alberto, Elduque, Alberto, and Tang, Liming

Subjects
Mathematics - Representation Theory, 17A30, 17A36, 15A69
Abstract

The affine group schemes of automorphisms of the multilinear r-fold cross products on finite-dimensional vectors spaces over fields of characteristic not two are determined. Gradings by abelian groups on these structures, that correspond to morphisms from diagonalizable group schemes into these group schemes of automorphisms, are completely classified, up to isomorphism., Comment: 23 pages

Published
2020

7. Dominios de Dedekind, factorización de ideales y aplicaciones

Author

Daza Garcia, Alberto, Rojas León, Antonio, and Universidad de Sevilla. Departamento de álgebra

Subjects
Teoría de anillos, Dominios de Dedekind
Abstract

In order to study some number theoretical problems, algebraic number fields and their ring of integers have being introduced. In this dissertation rings of integers and their arithmetic properties will be studied. Since they don’t have unique factorization, in the second chapter ideals will be used to generalize it as unique factorization of ideals. This will be proved in the more general case of Dedekind domains. Afterwards, it will be given a measure of “how far” they are from being principal ideal domains called the class number. Since the moment all those concepts are introduced, the objective of this dissertation will be to give a formula which relates the class number with the zeta functions. In order to do this, in chapter 3, it will be proved Minkowski theorem which will be used to find a bound to the discriminant (an invariant of the number fields) and in chapter 4 it will be proved the Dirichlet’s unit theorem which gives the structure of the group of units in the ring of integers. Finally, in chapter 5 we get the formula. Para estudiar algunos problemas de teoría de números, se han introducido los cuerpos de números algebraicos y sus anillos de enteros. En esta memoria se estudiarán los anillos de enteros y sus propiedades aritméticas. Como estos no tienen necesariamente factorización única, en el segundo capítulo se usarán los ideales para generalizarlo como factorización única de ideales. Se probará en el caso más general de dominios de Dedekind. Después, se dará una medida de “cómo de lejos” están de ser dominio de ideales principales llamada número de clases. Desde el momento en el que todos estos conceptos se han introducido, el objetivo de la memoria será el de dar una fórmula que relacione el número de clases con las funciones zeta. Para hacer esto, en el capítulo 3, se probará el teorema de Minkowski que será usado para encontrar una cota del discriminante (un invariante de los cuerpos de números) y en el capítulo 4, se probará el teorema de Dirichlet que da la estructura del grupo de unidades en el anillo de enteros. Finalmente, en el capítulo 5 obtendremos la fórumla. Universidad de Sevilla. Grado en Matemáticas

Published
2018

8. Dominios de Dedekind, factorización de ideales y aplicaciones

Author

Rojas León, Antonio, Universidad de Sevilla. Departamento de álgebra, Daza Garcia, Alberto, Rojas León, Antonio, Universidad de Sevilla. Departamento de álgebra, and Daza Garcia, Alberto

Abstract

In order to study some number theoretical problems, algebraic number fields and their ring of integers have being introduced. In this dissertation rings of integers and their arithmetic properties will be studied. Since they don’t have unique factorization, in the second chapter ideals will be used to generalize it as unique factorization of ideals. This will be proved in the more general case of Dedekind domains. Afterwards, it will be given a measure of “how far” they are from being principal ideal domains called the class number. Since the moment all those concepts are introduced, the objective of this dissertation will be to give a formula which relates the class number with the zeta functions. In order to do this, in chapter 3, it will be proved Minkowski theorem which will be used to find a bound to the discriminant (an invariant of the number fields) and in chapter 4 it will be proved the Dirichlet’s unit theorem which gives the structure of the group of units in the ring of integers. Finally, in chapter 5 we get the formula., Para estudiar algunos problemas de teoría de números, se han introducido los cuerpos de números algebraicos y sus anillos de enteros. En esta memoria se estudiarán los anillos de enteros y sus propiedades aritméticas. Como estos no tienen necesariamente factorización única, en el segundo capítulo se usarán los ideales para generalizarlo como factorización única de ideales. Se probará en el caso más general de dominios de Dedekind. Después, se dará una medida de “cómo de lejos” están de ser dominio de ideales principales llamada número de clases. Desde el momento en el que todos estos conceptos se han introducido, el objetivo de la memoria será el de dar una fórmula que relacione el número de clases con las funciones zeta. Para hacer esto, en el capítulo 3, se probará el teorema de Minkowski que será usado para encontrar una cota del discriminante (un invariante de los cuerpos de números) y en el capítulo 4, se probará el teorema de Dirichlet que da la estructura del grupo de unidades en el anillo de enteros. Finalmente, en el capítulo 5 obtendremos la fórumla.

Published
2018

Catalog

Books, media, physical & digital resources
See catalog results