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Enriched categories, topoi, abelian categories, monoidal categories, homological algebra.
7
votes
1
answer
161
views
When is the category of sheaves on a site compactly assembled/a continuous category?
If $(C,J)$ is a site, what is a natural condition on the Grothendieck topology $J$ to ensure that the category $Sh(C,J)$ is compactly assembled? I am both interested in the 1-categorical as well as th …
18
votes
0
answers
310
views
The analogy between dualizable categories and compact Hausdorff spaces
Efimov has in his recent preprint K-theory and localizing invariants of large categories, Appendix F, a long table of analogies between the categories $\text{Cat}^\text{dual}_\text{st}$ and $\text{Com …
2
votes
Grothendieck axioms and sheaf categories
The axiom AB6 holds in any category of sheaves on a site that can be constructed using only finite coverings. The reason is the following:
If checking for finite covers suffices, then filtered colimit …
3
votes
Is there an ∞-categorical interpretation of the Quillen S⁻¹S construction?
Consider an $E_n$-monoid X. We can deloop $X$ to an $\infty$-category $\mathbf{B}X$. There's a natural functor $X^\circlearrowleft : \mathbf{B}X \rightarrow \text{Spc}$ given by the left action of $X$ …
2
votes
Does Grayson/Quillen's "pre group completion" have a universal property?
It is the classifying category for the left action of $C$ on its product $C \times C$.
Let me elaborate on this a bit further. Let $C$ be an $E_\infty$-monoid, for example represented by a symmetric m …
14
votes
3
answers
2k
views
Is there a universal property characterizing the category of compact Hausdorff spaces?
This is in some sense a follow up to the question asked here Properties of the category of compact Hausdorff spaces
To clarify: The category $\text{Prof}$ of profinite sets sits inside the category $\ …
4
votes
1
answer
510
views
The "$\infty$"-column in the periodic table of n-categories
A monoid is the same as a category with a single object.
A monoidal category is the same as a bi-category with a single object.
A commutative monoid is the same as a bi-category with a single object …
3
votes
Does every Lawvere theory arise in this way?
I can elaborate on the second example a bit more:
Let $T$ be a Lawvere theory. Then $T$ is commutative iff $T \cong Lawv(\text{hom}_T(x,-))$, where $x$ is the generic object in $T$.
A Lawvere theory …
9
votes
0
answers
355
views
"Generalized theory of polynomials" for a given commutative Lawvere Theory
I am trying to understand
Nikolai Durov's "New Approach to Arakelov Geometry" right now and it got me thinking about a particular thing.
Let $R$ be a commutative, associative ring with unit. We can …