|
Descripción
|
|
|---|---|
| The symposium will be devoted to the latest developments in researches of both branches of quaternion algebras, non-split quaternion (division) algebra and split quaternion algebra. The most famous example of a non-split quaternion algebra is Hamilton's quaternions. One of the most famous split quaternion algebras is the split quaternions of James Cockle that also known as coquaternions. Although the study of the quaternion division algebra is more advanced, now the split quaternion algebra is also actively studing, and have extensive applications in geometry, physics, etc. But studies in these two branches are often independent and separated from each other. The main goal of the proposed Minisymposium is to bring together researchers of both branches of quaternion algebras in order to share experiences, methods and approaches in research to set the major lines of development for the near future. The topics include but not limited to the following: Quaternionic and coquaternionic analisys Linear (co-)quaternion algebra and matrix (co-)quaternion theory Applications of (co-)quaternions | |
|
Internacional
|
Si |
|
Nombre congreso
|
15th International Conference of Numerical Analysis and Applied Matehamtics (ICNAAM 2017). |
|
Tipo de participación
|
960 |
|
Lugar del congreso
|
Tesalónica (Grecia) |
|
Revisores
|
Si |
|
ISBN o ISSN
|
00000000 |
|
DOI
|
|
|
Fecha inicio congreso
|
25/09/2017 |
|
Fecha fin congreso
|
30/09/2017 |
|
Desde la página
|
20 |
|
Hasta la página
|
20 |
|
Título de las actas
|
AIP Conference Proceedings of ICNAAM 2017 |