On the geometry of an order unit space
Abstract
We introduce the notion of skeleton with a head in a non-zero real vector space. We prove that skeletons with heads describe order unit spaces geometrically. Next, we consider the notion of periphery corresponding to an order unit space which is a part of the skeleton. We note that periphery consists of boundary elements of the positive cone with unit norms. We discuss some elementary properties of the periphery. We also find a condition under which V would contain a copy of ∞n for some n ∈ N as an order unit subspace.
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