K0-group of absolute Matrix order unit spaces
Abstract
In this paper, we describe the Grothendieck group K0(V) of an absolute matrix order unit space V. For this purpose, we discuss the direct limit of absolute matrix order unit spaces. We show that K0 is a functor from category of absolute matrix order unit spaces with morphisms as unital completely · -preserving maps to category of abelian groups. We study order structure on K0(V) and prove that under certain condition K0(V) is an ordered abelian group. We also show that the functor K0 is additive on orthogonal unital completely · -preserving maps.
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