In mathematics, a Waldhausen category is a category C equipped with some additional data, which makes it possible to construct the K-theory spectrum of C using a so-called S-construction. It's named after Friedhelm Waldhausen, who introduced this notion (under the term category with cofibrations and weak equivalences) to extend the methods of algebraic K-theory to categories not necessarily of algebraic origin, for example the category of topological spaces.

Definition

Let C be a category, co(C) and we(C) two classes of morphisms in C, called cofibrations and weak equivalences respectively. The triple (C, co(C), we(C)) is called a Waldhausen category if it satisfies the following axioms, motivated by the similar properties for the notions of cofibrations and weak homotopy equivalences of topological spaces:

  • C has a zero object, denoted by 0;
  • isomorphisms are included in both co(C) and we(C);
  • co(C) and we(C) are closed under composition;
  • for each object AC the unique map 0 → A is a cofibration, i.e. is an element of co(C);
  • co(C) and we(C) are compatible with pushouts in a certain sense.

For example, if is a cofibration and is any map, then there must exist a pushout , and the natural map should be cofibration:

Relations with other notions

In algebraic K-theory and homotopy theory there are several notions of categories equipped with some specified classes of morphisms. If C has a structure of an exact category, then by defining we(C) to be isomorphisms, co(C) to be admissible monomorphisms, one obtains a structure of a Waldhausen category on C. Both kinds of structure may be used to define K-theory of C, using the Q-construction for an exact structure and S-construction for a Waldhausen structure. An important fact is that the resulting K-theory spaces are homotopy equivalent.

If C is a model category with a zero object, then the full subcategory of cofibrant objects in C may be given a Waldhausen structure.

S-construction

The Waldhausen S-construction produces from a Waldhausen category C a sequence of Kan complexes , which forms a spectrum. Let denote the loop space of the geometric realization of . Then the group

is the n-th K-group of C. Thus, it gives a way to define higher K-groups. Another approach for higher K-theory is Quillen's Q-construction.

The construction is due to Friedhelm Waldhausen.

biWaldhausen categories

A category C is equipped with bifibrations if it has cofibrations and its opposite category COP has so also. In that case, we denote the fibrations of COP by quot(C). In that case, C is a biWaldhausen category if C has bifibrations and weak equivalences such that both (C, co(C), we) and (COP, quot(C), weOP) are Waldhausen categories.

Waldhausen and biWaldhausen categories are linked with algebraic K-theory. There, many interesting categories are complicial biWaldhausen categories. For example: The category of bounded chain complexes on an exact category . The category of functors when is so. And given a diagram , then is a nice complicial biWaldhausen category when is.

References

  • Waldhausen, Friedhelm (1985), "Algebraic K-theory of spaces", Algebraic and geometric topology (New Brunswick, N.J., 1983 (PDF), Lecture Notes in Mathematics, vol. 1126, Berlin: Springer, pp. 318–419, doi:10.1007/BFb0074449, ISBN 978-3-540-15235-4, MR 0802796
  • C. Weibel, The K-book, an introduction to algebraic K-theory http://www.math.rutgers.edu/~weibel/Kbook.html
  • G. Garkusha, Systems of Diagram Categories and K-theory https://arxiv.org/abs/math/0401062
  • Sagave, S. (2004). "On the algebraic K-theory of model categories". Journal of Pure and Applied Algebra. 190 (1–3): 329–340. doi:10.1016/j.jpaa.2003.11.002.
  • Lurie, Jacob, Higher K-Theory of ∞-Categories (Lecture 16) (PDF)

See also

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