Search Results
Search type | Search syntax |
---|---|
Tags | [tag] |
Exact | "words here" |
Author |
user:1234 user:me (yours) |
Score |
score:3 (3+) score:0 (none) |
Answers |
answers:3 (3+) answers:0 (none) isaccepted:yes hasaccepted:no inquestion:1234 |
Views | views:250 |
Code | code:"if (foo != bar)" |
Sections |
title:apples body:"apples oranges" |
URL | url:"*.example.com" |
Saves | in:saves |
Status |
closed:yes duplicate:no migrated:no wiki:no |
Types |
is:question is:answer |
Exclude |
-[tag] -apples |
For more details on advanced search visit our help page |
Continuum theory, point-set topology, spaces with algebraic structure, foundations, dimension theory, local and global properties.
9
votes
1
answer
2k
views
What is Floer homology of a knot?
I've heard that there are different theories providing knot invariants in form of homologies. My understanding is that if you embed knot in a special way into a space, there is a special homology the …
5
votes
1
answer
320
views
Ramified covers of S^n
This question has been inspired by covering 3-torus post.
Is it true that any good (smooth, compact, oriented) $n$-manifold can be mapped to $S^n$ in such a way that the map is true covering away …
20
votes
How do you show that $S^{\infty}$ is contractible?
Kind of late to the party, but the (weak) contractibility follows from $\pi_i(S^\infty) = 0$ for $i>0$.
21
votes
5
answers
1k
views
Explanation for E_8's torsion
To study the topology of Lie groups, you can decompose them into the simple compact ones, plus some additional steps, such as taking the cover if necessary. After that, the structure of $SO(n)$'s is r …
22
votes
3
answers
2k
views
What is a TMF in topology?
What is a topological modular form? How are they related to 'normal' (number-theoretic) modular forms?
0
votes
Help me with this proof: Drop a printed map of the land on the land and there must be some c...
I want to comment on your last question: the classes.
The theorems mentioned rightly belong to the area of algebraic topology (the deep ideas behind them are of topological nature and are usually exp …
1
vote
2
answers
192
views
Something like Yoneda's lemma
This is inspired by The Whitehead for maps question.
Consider two maps f, g: X\to Y which happen to induce the same maps (of discrete spaces) [Z, X] \to [Z, Y] for every Z. Does this mean f and g are …
1
vote
Something like Yoneda's lemma
I found it myself: the image of id \in [X, X] under both maps will be the same class in [X, Y], which is the definition of homotopy between f and g, so the ansewr is yes.
7
votes
The ants-on-a-ball problem
The post consists of initial ideas on top and the proof at the bottom.
I think the key idea is to perform the process opposite to what you describe about subdividing into triangles. Indeed, our pro …