Fixed points subgroups by two involutive automorphisms $\sigma, \gamma$ of compact exceptional Lie groups $F_4, E_6$ and $E_7$

Authors
Type
Published Article
Publication Date
Dec 16, 2010
Submission Date
Dec 16, 2010
Identifiers
arXiv ID: 1012.3514
Source
arXiv
For simply connected compact exceptional Lie groups $G = F_4, E_6$ and $E_7$, we consider two involutions $\sigma, \gamma$ and determine the group structure of subgroups $G^{\sigma,\gamma}$ of $G$ which are the intersection $G^\sigma \cap G^{\gamma}$ of the fixed points subgroups of $G^\sigma$ and $G^{\gamma}$. The motivation is as follows. In [1](see the References of this paper), we determine the group structure of $(F_4)^{\sigma, \sigma'}, (E_6)^{\sigma, \sigma'}$ and $(E_7)^{\sigma, \sigma'}$, and in [2](see the References of this paper), we also determine the group structure of $(G_2)^{\gamma, \gamma'}, (F_4)^{\gamma, \gamma'}$ and $(E_6)^{\gamma, \gamma'}$. So, in this paper, we try to determine the type of groups $(F_4)^{\sigma, \gamma}, (E_6)^{\sigma, \gamma}$ and $(E_7)^{\sigma, \gamma}$.