The R-Shilov boundary for a local operator space
Abstract
To extend the notion of the injective envelope of a unital operator space to the locally convex case, Dosi (2014) first introduced the notion of the injective R-envelope for a unital operator space and then defined the injective R-envelope for a unital local operator space as the closure of the injective R-envelope for its bounded part. In this paper, we investigate the existence of the Shilov boundary ideal in this context, as defined by Arveson (1969). To do this, by following the conceptual frameworks underlying Hamana's constructions of the injective envelope and the C*-envelope, respectively, we define the notions of the injective R-envelope and the R-C*-envelope for a unital local operator space. Furthermore, we show that the injective R-envelope construction given by us coincides with the one given by Dosi (2014).
Growth and citations
This paper is currently showing No growth state computed yet..
Citation metrics and growth state from academic sources (e.g. Semantic Scholar). See About for details.
Cited by (0)
No citing papers yet
Papers that cite this one will appear here once data is available.
View citations page →References (0)
No references in DB yet
References for this paper will appear here once ingested.
Related papers in Functional Analysis
- Invariant Extremal Projections for Operator-Ordered Families0 citations
- Regularity of compact convex sets--classical and noncommutative0 citations
- Base norm spaces--classical, complex, and noncommutative0 citations
Growth transitions
No transitions recorded yet
Growth state transitions will appear here once computed.