Pere Pascual Gainza, Llorenc Rubio i Pons
Published 2007-06-15, updated 2007-10-04Version 2
In this note we apply Guillen-Navarro descent theorem, \cite{GN02}, to define a descent variant of the algebraic $K$-theory of varieties over a field of characteristic zero, $\mathcal{KD}(X)$, which coincides with $\mathcal{K}(X)$ for smooth varieties. After a result of Haesemeyer, this new theory is equivalent to the homotopy algebraic $K$-theory introduced by Weibel. We also prove that there is a natural weight filtration on the groups $KH_\ast(X)$.
A Newtonian and Weierstrassian Approach to Local Resolution of Singularities in Characteristic Zero
On the algebraic K-theory of Spec Z^N
Algebraic K-theory of varieties $SL_{2n}/Sp_{2n}$, $E_6/F_4$ and their twisted forms
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