Multiplicative Structures on Algebraic K-Theory
The algebraic $K$-theory of Waldhausen $\infty$-categories is the functor corepresented by the unit object for a natural symmetric monoidal structure. We therefore regard it as the stable homotopy theory of homotopy theories. In particular, it respects all algebraic structures, and as a result, we obtain the Deligne Conjecture for this form of $K$-theory.
2010 Mathematics Subject Classification: 19D10, 19D55
Keywords and Phrases: Keywords and Phrases: algebraic K-theory, Waldhausen infty-categories, multiplicative structures, Deligne conjecture
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