Jochen Glück
Published 2018-07-03Version 1
Consider an Archimedean partially ordered vector space $X$ with generating cone (or, more generally, a pre-Riesz space $X$). Let $P$ be a linear projection on $X$ such that both $P$ and its complementary projection $I - P$ are positive; we prove that the range of $P$ is a band. This shows that the well-known concept of band projections on vector lattices can, to a certain extent, be transferred to the framework of ordered vector spaces.
Domination properties and extension of positive compact operators on pre-Riesz spaces
On Φ-Schauder frames
On disjointness, bands and projections in partially ordered vector spaces
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