K0-theory of n-potents in rings and algebras

Abstract

Let n ≥ 2 be an integer. An n-potent is an element e of a ring R such that en = e. In this paper, we study n-potents in matrices over R and use them to construct an abelian group K0n(R). If A is a complex algebra, there is a group isomorphism K0n(A) (K0(A))n-1 for all n ≥ 2. However, for algebras over cyclotomic fields, this is not true in general. We consider K0n as a covariant functor, and show that it is also functorial for a generalization of homomorphism called an n-homomorphism.