@misc{10498/16075,
year = {1994},
month = {1},
url = {http://hdl.handle.net/10498/16075},
abstract = {P.Ara and K.R.Goodearl, in [1], introduced and studied the concept of a regular ring R satisfying the following condition, which they called condition  is dense in Aff(S(Ko(R)[R]))†, where Φ denotes the natural map from Ko(R) to Aff(S(Ko(R)[R])). They proved that every nonartinian, stably finite, strictly unperforated, simple regular ring satisfies condition (D). In this note we prove that a regular ring R satisfies condition (D) if and only if R has no nonzero artinian homomorphic image. We then obtain as a consequence that every nonartinian, simple regular ring satisfies condition (D},
publisher = {Taylor & Francis},
title = {On a density condition for K0+ of von Neumann regular rings},
doi = {10.1080/00927879408824870},
author = {Pardo Espino, Enrique},
}