All Questions
Tagged with lo.logic sheaf-theory
9 questions
7
votes
1
answer
205
views
Variation on definition of logical functors avoiding power objects
Without power sets in meta-theory not every Grothendieck topos is an elementary topos, Set is still Grothendieck, but it lacks power objects.
Now I am looking for a definition of a logical functor ...
- 1,347
5
votes
0
answers
146
views
Do presheaf toposes satisfy the full fan theorem?
Presheaf toposes satisfy LPO and (edit: if over categories with binary products) PAx and countable choice internally, so they automatically satisfy the stable fan theorem (every bar which is the ...
- 1,947
17
votes
1
answer
442
views
Examples of statements that are valid in every spatial topos
I am looking for statements¹ that, when interpreted in the internal language of a topos, are valid in all spatial toposes (i.e., the topos of sheaves of any topological space) that are not valid in ...
- 32.5k
14
votes
0
answers
297
views
Ordinal-valued sheaves as internal ordinals
Let $X$ be a topological space (feel free to add some separation axioms like “completely regular” if they help in answering the questions). Let $\alpha$ be an ordinal, identified as usual with $\{\...
- 32.5k
7
votes
0
answers
386
views
Sheafs in O-minimal Structures
Let $\mathcal{N} = (N, <, \ldots)$ be an o-minimal structure and let $X \subset N^m$ be a definable set. Following the procedure stablished by Edmundo, Jones and Peatfield in "Sheaf cohomology in o-...
- 243
10
votes
1
answer
504
views
Is there a way to "puncture" a topos?
Let $E$ be a (Grothendieck) topos, e.g. $E = \text{Sh}(X)$ for a topological space $X$. And let $p = (p^*, p_*):\text{Set}\to E$ be a point of $E$, is there a way to "puncture" $E$ in some sense? By "...
- 629
2
votes
0
answers
266
views
Relationship between coherent toposes/coherent logic and coherent sheaves
I've heard it claimed that the adjective "coherent" in logic/topos theory (i.e. coherent logic, coherent toposes, coherent categories) was adopted to fit in with the terminology of coherent sheaves in ...
- 3,058
14
votes
1
answer
457
views
References regarding a connection between recursion theory and sheaves
In Manin's A Course in Mathematical Logic for Mathematicians, he defines (p.201) a structure $(\mathcal{E},R)$ given an enumerable set $E \subset (\mathbb{Z}^+)^n$ by:
$\mathcal{E}$ is the set of all ...
user2028
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 (...
- 2,537