A banach algebra approach to loos symmetric cones
Document Type
Article
Publication Date
1-1-2020
Abstract
We consider Loos symmetric spaces on an open cone ω in the Banach space setting and show how such Loos symmetric spaces may be realized from the set of elements inverted by an involution on a Banach-Lie group. The group is a subgroup of the group of invertible elements of the Banach algebra of all bounded linear transformations on the Banach space V = ω ω. This construction connects the theory of Loos symmetric cones to that of involutive Lie groups.
Publication Source (Journal or Book title)
Journal of Lie Theory
First Page
461
Last Page
471
Recommended Citation
Lawson, J. (2020). A banach algebra approach to loos symmetric cones. Journal of Lie Theory, 30 (2), 461-471. Retrieved from https://repository.lsu.edu/mathematics_pubs/569