Abstract - It is now well known that the K-theory of a Waldhausen category depends on more than just its (triangulated) homotopy category (Invent. Math. 150 (2002) 111). The purpose of this note is to show that the K-theory spectrum of a (good) Waldhausen category is completely determined by its Dwyer–Kan simplicial localization, without any additional structure. As the simplicial localization is a refined version of the homotopy category which also determines the triangulated structure, our result is a possible answer to the general question: “To which extent K-theory is not an invariant of triangulated derived categories? ”
A remark on K-theory and S-categories / G. VEZZOSI; B. TOEN. - In: TOPOLOGY. - ISSN 0040-9383. - STAMPA. - 43:(2004), pp. 765-791. [10.1016/j.top.2003.10.008]
A remark on K-theory and S-categories
VEZZOSI, GABRIELE;
2004
Abstract
Abstract - It is now well known that the K-theory of a Waldhausen category depends on more than just its (triangulated) homotopy category (Invent. Math. 150 (2002) 111). The purpose of this note is to show that the K-theory spectrum of a (good) Waldhausen category is completely determined by its Dwyer–Kan simplicial localization, without any additional structure. As the simplicial localization is a refined version of the homotopy category which also determines the triangulated structure, our result is a possible answer to the general question: “To which extent K-theory is not an invariant of triangulated derived categories? ”
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A remark on K-theory and S-categories.pdf
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Abstract-K-Theory-Topology.rtf
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