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6 votes
0 answers
103 views

Is the derived category of sheaves localised at pointwise homotopy equivalences locally small?

In order to define the cup and cross products in sheaf cohomology, Iversen makes computations in an intermediate derived category. If $K(X;k)$ is the triangulated category of cochain complexes of ...
FShrike's user avatar
  • 1,021
49 votes
4 answers
7k views

Sheaf-theoretic approach to forcing

Inspired by the question here, I have been trying to understand the sheaf-theoretic approach to forcing, as in MacLane–Moerdijk's book "Sheaves in geometry and logic", Chapter VI. A general ...
Peter Scholze's user avatar
13 votes
1 answer
614 views

How strong a set theory is necessary for practical purposes in sheaf theory?

Is it known how much of ZFC is actually necessary for the basic, familiar constructions and theorems in sheaf theory, along the lines of section II.1 (and its exercises) in Hartshorne's "Algebraic ...
user avatar
3 votes
1 answer
308 views

The size of sheafification

Let $X$ be a small site. Let $\aleph$ be an infinite cardinal, such that $|Ob(X)|\leq \aleph$ and $|Mor(X)|\leq \aleph$, where $Mor(X)$ is the set of all morphisms. We define the size of a presheaf $...
Rene Recktenwald's user avatar
11 votes
1 answer
892 views

Are all Grothendieck topologies on Set equivalent?

The category $\textbf{Set}$ can be given a Grothendieck topology where the covering families are jointly surjective families of set inclusions $\{X_i\stackrel{\phi_i}{\hookrightarrow} X\}\in\mathrm{...
Qfwfq's user avatar
  • 23.3k
4 votes
0 answers
261 views

Can one construct Freyd-Mitchell's embeddings that respect sheafifications?

For a certain presheaf $P$ with values in an abelian category $A$ satisfying AB5 and its sheafification $S$ (with respect to a small Grothendieck site) I would like to prove: $S(f):S(X)\to S(Y)$ is ...
Mikhail Bondarko's user avatar
2 votes
0 answers
450 views

large cardinal tree properties as properties of sheaves

As follows from this talk Large Properties for Small Cardinals, p.7,p.4 http://www2.dm.unito.it/paginepersonali/viale/SEMINARS-TORINO/Fontanella-Torino-19.1.2012.pdf, the definitions of weakly compact ...
o a's user avatar
  • 468
7 votes
1 answer
1k views

Encoding fuzzy logic with the topos of set-valued sheaves

One of the canonical examples used by Barr & Wells in order to motivate the use of topoi is that we can construct a theory for fuzzy logic and fuzzy set theory as set-valued sheaves on a poset (...
Mikael Vejdemo-Johansson's user avatar