| |
|
Description: |
We study the structure of graded Leibniz algebras with arbitrary dimension and over an arbitrary base field. We show that any of such algebras with a symmetric G-support is the sum of a subspace of L_1 (the homogeneous component associated to the unit element 1 in G) with a family of I_j, a well described graded ideals of L, satisfying [I_j,I_k] = 0 if j, k are different. In the case of L being of maximal length we characterize the simplicity of the algebra in terms of connections in the support of the grading.
(Joint work with Antonio J. Calderón)
|
|
Date: |
|
| Start Time: |
16:00 |
|
Speaker: |
José M. Sánchez Delgado (Univ. Malaga, Spain)
|
|
Institution: |
University of Málaga, Spain
|
|
Place: |
Room 5.5 (DMUC)
|
| Research Groups: |
-Algebra and Combinatorics
|
|
See more:
|
<Main>
|
|
