An imbedding property of K-groups, by Grzegorz Banaszak http://www.math.uiuc.edu/K-theory/0771
Descent properties for homotopy K-theory , by Christian Haesemeyer: http://www.math.uiuc.edu/K-theory/0650
http://www.math.uiuc.edu/K-theory/0703
arXiv: Experimental full text search
KT (K-theory), AG (Algebraic geometry)?
Kth
See Algebraic K-theory and cubical descent
Voevodsky ICM talk: Homotopy alg Kth agrees with Voevodsky’s spectrum definition, for Sm/S, for any noetherian S I think.
arXiv:1003.1487 Descente par éclatements en K-théorie invariante par homotopie fra arXiv Front: math.KT av Denis-Charles Cisinski These notes give a proof of the representability of homotopy invariant K-theory in the stable homotopy category of schemes (which was announced by Voevodsky). One deduces from the proper base change theorem in stable homotopy theory of schemes a descent by blow-ups theorem for homotopy invariant K-theory.
nLab page on Homotopy K-theory