K1 and K-groups of absolute matrix order unit spaces

Abstract

In this paper, we describe the Grothendieck groups K1(V) and K(V) of an absolute matrix order unit space V for unitary and partial unitary elements respectively. For this purpose, we study some basic properties of unitary and partial unitary elements, and define their path homotopy equivalence. The construction of K(V) follows in a almost similar manner as that of K1(V). We prove that K1(V) and K(V) are ordered abelian groups. We also prove that K1(V) and K(V) are functors from the category of absolute matrix order unit spaces with morphisms as unital completely · -preserving maps to the category of ordered abelian groups. Later, we show that under certain conditions, quotient of K(V) is isomorphic to the direct sum of K0(V) and K1(V), where K0(V) is the Grothendieck group for order projections.