Published January 2018
| Submitted
Journal Article
Open
Boundary representations of operator spaces, and compact rectangular matrix convex sets
- Creators
- Fuller, Adam H.
- Hartz, Michael
-
Lupini, Martino
Abstract
We initiate the study of matrix convexity for operator spaces. We define the notion of compact rectangular matrix convex set, and prove the natural analogs of the Krein--Milman and the bipolar theorems in this context. We deduce a canonical correspondence between compact rectangular matrix convex sets and operator spaces. We also introduce the notion of boundary representation for an operator space, and prove the natural analog of Arveson's conjecture: every operator space is completely normed by its boundary representations. This yields a canonical construction of the triple envelope of an operator space.
Additional Information
© 2018 Theta Foundation. M.H. was partially supported by an Ontario Trillium Scholarship and a Feodor Lynen Fellowship. M.L. was partially supported by the NSF Grant DMS-1600186. This work was initiated during a visit of M.H. at the California Institute of Technology in the Spring 2016, and continued during a visit of M.H. and M.L. at the Oberwolfach Mathematics Institute supported by an Oberwolfach Leibnitz Fellowship. The authors gratefully acknowledge the hospitality and the financial support of both institutions.Attached Files
Submitted - 1610.05828.pdf
Files
1610.05828.pdf
Files
(397.5 kB)
| Name | Size | Download all |
|---|---|---|
|
md5:026ec72e48e89fcede907c287b6afb33
|
397.5 kB | Preview Download |
Additional details
- Eprint ID
- 85738
- Resolver ID
- CaltechAUTHORS:20180410-161452217
- Ontario Trillium Scholarship
- Alexander von Humboldt Foundation
- DMS-1600186
- NSF
- Caltech
- Oberwolfach Mathematics Institute
- Created
-
2018-04-11Created from EPrint's datestamp field
- Updated
-
2021-11-15Created from EPrint's last_modified field