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Enriched categories, topoi, abelian categories, monoidal categories, homological algebra.

26 votes
1 answer
2k views

Infinity-categorical analogue of compact Hausdorff

Recently I became through this mathoverflow question aware of the article Codensity and the ultrafilter monad by Tom Leinster. There he shows that the ultrafilter monad on the category $\mathrm{Set}$ …
Lennart Meier's user avatar
8 votes

Colimits of cofibrations and homotopy colimits

In general, this is certainly not true. Take for example a space $X$ with an action by a group $G$. As a group acts by isomorphisms, it acts in particular by cofibrations. But the map $X/G \to X_{hG}\ …
Lennart Meier's user avatar
9 votes

(Homotopy theory) When does the 2 of 3 property not imply 2 of 6?

Here is an example, which I got from a discussion with Karol Szumilo (and maybe he got it from Cisinski?). Consider the notion of a cofibration category, which means essentially that you have weak e …
Lennart Meier's user avatar
35 votes

What non-categorical applications are there of homotopical algebra?

As soon as you do serious homotopy theory in a context outside topological spaces, a formalism for abstract homotopy theory is very helpful. Let's give a few examples: 1) Waldhausen's algebraic K-the …
13 votes
1 answer
2k views

Homotopy limits of quasi-categories

Quasi-categories (or $\infty$-categories, as they are often called) are a very convenient setting for doing abstract homotopy theory. One of their amazing features is the following: Given a diagram of …
Lennart Meier's user avatar
9 votes
Accepted

What is the topology on hom-sets of spectra?

If $X = (X_n)$ and $Y = (Y_n)$ are spectra, one can define a morphism just to be a collection of maps $x_n \to Y_n$ commuting with the suspensions. Thus the set of morphisms between $X$ and $Y$ is a s …
Lennart Meier's user avatar
5 votes
0 answers
672 views

Pullbacks of Abelian Categories and their Ext-Groups

Let $\mathcal{A}$, $\mathcal{B}$ and $\mathcal{C}$ be abelian categories and $F: \mathcal{A} \to \mathcal{C}$ and $G: \mathcal{B} \to \mathcal{C}$ be functors between them. It is then possible to defi …
Lennart Meier's user avatar
8 votes
2 answers
408 views

Localizing Model Structures

I came along the following question while trying to understand and apply some ideas of Dugger's article Universal Homotopy Theories. Suppose, we are given a nice model category $\mathcal{C}$, say le …
Lennart Meier's user avatar