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\item Fundamental exact sequence   \item Genstern resolution for smooth-semilocal ring over $k$.   \item Explain why it is important compute the K-theory of algebraically closed fields.  \item Also it would be nice to give explicity computations of $K_0$, $K_1$, $K_2$ for fields.  \end{itemize} 
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%%%%%%%%%%%%%%%%%%%  %%%Grabriela  \paragraph{Talk 4: } 2: K-theory for finite fields}  Quillen's work in Adam's conjecture  Follow Mitchell, \emph{Notes on the K-theory of finite fields}.  See Quillen, \emph{On the cohomology and K-theory of GL over a finite field} for more details.  \paragraph{Talk 5: }  \subsection{Borel's theorem} 
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\paragraph{Talk 9: The rigidity theorem}  \paragraph{Talk 10: K-theory for finite fields}  Quillen's work in Adam's conjecture  Follow Mitchell, \emph{Notes on the K-theory of finite fields}.  See Quillen, \emph{On the cohomology and K-theory of GL over a finite field} for more details.  \paragraph{Talk 11: K-theory of algebraically closed fields}  The purpuse of this section is prove one of the Quillen-Lichtembaum conjectures