Homotopy structures realizing algebraic kk-theory
Abstract
Algebraic kk-theory, introduced by Corti\~nas and Thom, is a bivariant K-theory defined on the category Alg of algebras over a commutative unital ring . It consists of a triangulated category kk endowed with a functor from Alg to kk that is the universal excisive, homotopy invariant and matrix-stable homology theory. Moreover, one can recover Weibel's homotopy K-theory KH from kk since we have kk(,A)=KH(A) for any algebra A. We prove that Alg with the split surjections as fibrations and the kk-equivalences as weak equivalences is a stable category of fibrant objects, whose homotopy category is kk. As a consecuence of this, we prove that the Dwyer-Kan localization kk∞ of the ∞-category of algebras at the set of kk-equivalences is a stable infinity category whose homotopy category is kk.
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