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3 votes
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147 views

Cell structure on the function space $\operatorname{Hom}(X,Y)$

By the Theorem of Milnor in his paper "On spaces having the homotopy type of a CW-complex", the function space $\operatorname{Hom}(X,Y)$ (with the compact-open topology) is homotopy ...
May's user avatar
  • 140
10 votes
1 answer
659 views

Are there any tests for knowing whether a topological space admits a CW structure?

We know that for n $\ge$ 5, a manifold admits a piecewise linear structure if and only if its Kirby-Siebenmann class vanish and Galewski and Stern showed the existence of a similar invariant to test ...
Tyrannosaurus's user avatar
2 votes
1 answer
380 views

Is it always possible to connect the endpoints of a smooth injective path, so the resulting path is smooth, closed and simple?

Motivation The motivation for this question arises from the following problem: Is there a closed, simple, and infinitely differentiable path on the (complex) plane such that every straight line has a ...
Gabriel Franceschi Libardi's user avatar
3 votes
0 answers
119 views

Signature vs commensurability

If a closed oriented $4n$-dimensional manifold $M$ has an orientation-reversing homeomorphism, then the signature $\sigma(M)$ of the intersection form vanishes. More generally, $\sigma(M) = 0$ if $M$ ...
asd's user avatar
  • 41
4 votes
0 answers
177 views

Basis of topology on space of properly embedded smooth manifolds

In A Short Exposition of the Madsen-Weiss Theorem, Hatcher discusses (starting at p.6) a basis for a topology on the space $\mathcal{C}^n$, the space of all smooth oriented $d$-dimensional ...
jasnee's user avatar
  • 141
5 votes
1 answer
378 views

Why is this Brieskorn manifold a rational homology sphere?

In Némethi's book "Normal surface singularities", Example 5.1.17, there is a formula to find the Seifert invariants of a Brieskorn complete intersection $\Sigma(a_1,...,a_n)$. I am ...
user13121312's user avatar
8 votes
1 answer
224 views

Can increasing the winding number of a 2-cell make a CW complex embeddable?

Let $X$ be a 2-dimensional CW complex and let $c\subset X$ be a 2-cell attached along a simple closed loop $\gamma$ in the 1-skeleton $X^{(1)}$. For a natural number $n\ge 2$ consider the operation of ...
M. Winter's user avatar
  • 13.6k
25 votes
1 answer
582 views

Does every oriented $3$-dimensional submanifold of $\mathbb{R}^6$ bound an oriented $4$-dimensional submanifold?

In my recent research, I encountered the following problem about embeddings. Let $M^3$ be a closed compact oriented smooth $3$-dimensional submanifold of $\mathbb{R}^6$. Does there exist a compact ...
Zhenhua Liu's user avatar
9 votes
0 answers
159 views

Is there a closed aspherical manifold with infinitely many symmetries and without essential immersed tori?

The precise question is the following: Is there a closed aspherical manifold $M$ of dimension $n\geq 3$ such that Out($\pi_1(M)$) is infinite and $\pi_1(M)$ does not contain $\mathbb Z \times \mathbb ...
Bruno Martelli's user avatar
7 votes
1 answer
435 views

What are the covering spaces of $\mathbb{Q}$?

Let $X = \mathbb{Q}$, topologized as a subset of the real line. Is there a reasonable description of the covering spaces of $X$? Here is something more precise. One way of constructing covers $p: \...
BasicQuestionBot's user avatar
5 votes
0 answers
92 views

For spaces $U$ and discrete sets $I,J$, are maps $f\colon U \times I \rightarrow U \times J$ commuting with the projection to $U$ covering spaces?

Let $U$ be a topological space, let $I$ and $J$ be discrete sets, and let $f\colon U \times I \rightarrow U \times J$ be a continuous map that commutes with the projection onto the first factor. In ...
BasicQuestionBot's user avatar
6 votes
1 answer
206 views

A stable splitting of linear surjections

Some computations I've been doing in Weiss calculus predict the following stable splitting of the space of linear surjections: $\Sigma^\infty_+ \mathrm{Sur}(\mathbb{R}^n,\mathbb{R}^{m_1+m_2})$ as the ...
Connor Malin's user avatar
  • 5,839
5 votes
1 answer
380 views

Proving the Cork Theorem

I am reading Kirby's paper paper "Akbulut's corks and h-cobordisms of smooth simply connected 4-manifolds" and I have a question about how to actually prove the cork theorem from the results ...
failedentertainment's user avatar
1 vote
0 answers
61 views

Map from simplex to itself that preserves sub-simplices: revisited

Here it is proved that, if $f$ is a continuous map from an $n$-simplex $\Delta$ to itself, that maps each sub-simplex of $\Delta$ to itself, then $f$ must be onto $\Delta$ (surjective). I would like ...
Erel Segal-Halevi's user avatar
4 votes
1 answer
253 views

Intersection pairing on non-compact surface

Let $S$ be a smooth oriented connected $2$-manifold. We have an algebraic intersection pairing $\omega\colon H_1(S) \times H_1(S) \rightarrow \mathbb{Z}$. If $S$ is compact, then this is ...
Roger's user avatar
  • 43
14 votes
0 answers
326 views

When can we extend a diffeomorphism from a surface to its neighborhood as identity?

Let $M$ be a closed and simply-connected 4-manifold and let $f: M^4 \to M^4$ be a diffeomorphism such that $f^*: H^*(M;\mathbb{Z})\to H^*(M;\mathbb{Z})$ is the identity map. Moreover, let $\Sigma \...
Anubhav Mukherjee's user avatar
13 votes
1 answer
518 views

Low dimensional homotopy groups of $\operatorname{Top}(4)$

$\DeclareMathOperator\Top{Top}$I would like to compute $\pi_3\Top(4)$ and $\pi_4\Top(4)$. It is known that $\Top(4)/O(4) \rightarrow \Top/O$ is 5-connected and $$ \pi_k(\Top/O) = \begin{cases} ...
Oleksandr Kharchenko's user avatar
2 votes
0 answers
116 views

Generalized Stokes's theorem and the relationship of volume to surface area of objects of arbitrary genus

In this post I saw that it could be explained with the Generalized Stokes's theorem why the derivative of the area of a circle is equal to the boundary of the circle (the circumference): $$C=\frac{d}{...
User198's user avatar
  • 131
1 vote
0 answers
48 views

Connected pre-images spanning $n$-cubes under dimension reducing maps

Let $I^n = [0,1]^n$ be the $n$-dimensional hypercube. For a continuous function $f: I^n \to \mathbb{R}^m$ with $m < n$, we're interested in the existence of points $p \in \mathbb{R}^m$ whose ...
user avatar
3 votes
1 answer
431 views

Detecting a PL sphere and decompositions

Question 1. A PL $n$-sphere is a pure simplicial complex that is a triangulation of the $n$-sphere. I'm looking for a computer algorithm that gives a Yes/No answer to whether a given simplicial ...
Uzu Lim's user avatar
  • 903
8 votes
0 answers
118 views

Defining convex sums locally on the sphere?

$S^1$ and the torus $T^2$ are spaces in which convex combinations don't make sense globally but do locally. Despite their standard representations in $\mathbf{R}^2$ and $\mathbf{R}^3$ respectively not ...
aleph2's user avatar
  • 637
2 votes
1 answer
179 views

Model structures on simplicial presheaves of piecewise-linear manifolds

Let $\mathbf{PL}$ denote the category of piecewise-linear manifolds. The goal is to embed $\mathbf{PL}$ into a category of simplicial presheaves, endow it with a model structure, and then localize it ...
user avatar
4 votes
1 answer
276 views

Preserving simple-connectedness under intersection complexes

Given a simplicial complex $X$, and a family of its subcomplexes $\{U_i\}_{i\in I}$, we define the corresponding intersection complex to be the simplicial complex $X_U$ with vertex set $I$ where $A \...
Agelos's user avatar
  • 1,926
8 votes
1 answer
557 views

Relation between 16 $\mathbf{CP}^2$ and $\overline{K3}$

In bordism theory and algebraic topology, 4d spin bordism group is generated by $K3$ surface, while 4d $SO$ bordism group generated by $\mathbf{CP}^2$. $K3$'s 4-manifold signature is $- 16$ and $\...
zeta's user avatar
  • 447
15 votes
1 answer
541 views

Where is the Steenrod Realization problem at?

I'm wondering if there is a more modern reference out there for the Steenrod Realization Problem than the book of Connor and Floyd? Realizing homology classes in a manifold via embedded submanifolds, ...
Ryan Budney's user avatar
  • 44.4k
1 vote
0 answers
57 views

extendability of fibre bundles on manifolds with same dimensions

Let $M$ be an $m$-manifold. Let $M'\subseteq M$, where $M'$ is also an $m$-manifold. Let $N$ be an $n$-manifold. Let $N'\subseteq N$, where $N'$ is also an $n$-manifold. Suppose there is fibre ...
Shiquan Ren's user avatar
6 votes
1 answer
373 views

Fivebrane bordism $\Omega_d^{\mathrm{Fivebrane}}$

$\newcommand{\Fr}{\mathrm{Fr}}\newcommand{\Fivebrane}{\mathrm{Fivebrane}}\newcommand{\String}{\mathrm{String}}\DeclareMathOperator\Spin{Spin}\DeclareMathOperator\SO{SO}\DeclareMathOperator\GL{GL}$What ...
wonderich's user avatar
  • 10.5k
0 votes
1 answer
135 views

Local embedding and disk in domain perturbation

Consider say $M=(\mathbb{S}^1\times\dotsb\times \mathbb{S}^1)-q$ ($n$-times). Assume that $B$ is an $n$ disk in $M$ (for instance, thinking of $\mathbb{S}^1$ as gluing $-1$ and $1$, the cube $B=[-\...
monoidaltransform's user avatar
1 vote
0 answers
132 views

The equation of cubic surface

I was studying the nature of singularities of cubic hypersurface on $\Bbb P^{n+1}$. The chosen form was $$f(x_0,x_1 \dots , x_{n+1})=x_0^3+x_1^3+\dotsb+x_{n+1}^3-c(x_0+x_1+\dotsb+x_{n+1} )^3=0.$$ I ...
mecid. s.'s user avatar
3 votes
3 answers
537 views

Fundamental group of a generalized connected sum

Let $M$ and $N$ be two $n$ dimensional connected closed manifolds with $n \ge 3$, and let $S$ be a $(n-1)$ dimensional closed submanifold common to $M$ and $N$. Consider the connected sum of $M$ and $...
Jeremy's user avatar
  • 311
1 vote
0 answers
61 views

Necessary or sufficient conditions for the $k$-fold intersection to be empty in a covering with a "tree structure"

Consider a finite collection of $d$-dimensional balls $\mathfrak{B}=\{B_1,\ldots,B_n\}$ which cover a PL $d$-manifold $M$, i.e. $M=\bigcup_{i=1}^{n}B_i$. Suppose we want to compute the Euler ...
rab's user avatar
  • 159
5 votes
1 answer
429 views

Linking number and intersection number

Consider a disjoint union of two circles $A$ and $B$ smoothly embedded in $\mathbb{R}^3$ with linking number more than $1$. Suppose we know that there exists a disc $D$ in $\mathbb{R}^3$ such that $\...
user429294's user avatar
0 votes
1 answer
328 views

Relationship between quotient CW-complexes after attaching cells

I have been trying to prove the following simple-looking result which I require for some work in low-dimensional topology. I expect it is likely true and in a textbook somewhere so any reference or ...
William Thomas's user avatar
4 votes
0 answers
184 views

Obstruction to finding a Whitney disk

Let $p,q\geq 3$ be integers. Let $M$ be a compact oriented smooth $(p+q)$-manifold and $P$ and $Q$ compact submanifolds of dimensions $p$ and $q$ intersecting transversely. Assume that $M,P$ and $Q$ ...
João Lobo Fernandes's user avatar
13 votes
1 answer
580 views

Identifying two definitions of orientation on a vector space

Let $V$ be an $n$-dimensional real vector space. Here are two definitions of an orientation on $V$: A generator of the $1$-dimensional vector space $\wedge^n V$, up to multiplication by positive ...
Jean's user avatar
  • 133
2 votes
0 answers
414 views

$$ \left(\frac{\text{Man}^{\text{fr}}}{\text{Cobordism}},\coprod,\times \right)\simeq \left((\text{Fin}^{\simeq},\coprod)^{\text{gp}},\times\right)?$$ [closed]

If we combine a theorem of Pontryagin and the Barratt-Priddy-Quillen theorem we get that both sides of $$ \left(\frac{\mathrm{Man}^{\mathrm{fr}}}{\mathrm{Cobordism}},\coprod,\times \right)\simeq \left(...
Ola Sande's user avatar
  • 705
7 votes
1 answer
292 views

Computing $\pi_1$ of the complement of a non-singular plane curve

The following is a well-known fact: Theorem. The fundamental group of the complement of a non-singular curve of degree $d$ in the complex projective plane is cyclic of order $d$. This was further ...
Marco Golla's user avatar
  • 10.9k
3 votes
1 answer
132 views

Geodesic laminations on the 4-punctured sphere

Let $S_{0,4}$ be the 4-punctured sphere equipped with a hyperbolic metric of finite volume (thus all punctures are cusps). Consider $\gamma$ to be a simple geodesic of $S_{0,4}$ (not necessarily ...
Nelson Schuback's user avatar
3 votes
1 answer
200 views

Does the group of compactly supported diffeomorphisms have the homotopy type of a CW complex?

It is known that the group of diffeomorphisms of a compact manifold with the natural $C^{\infty}$ topology has the homotopy type of a countable CW complex. See for instance this thread: Is the space ...
Yasha's user avatar
  • 491
5 votes
0 answers
158 views

Representing some odd multiples of integral homology classes by embedded submanifolds

Consider an $m$-dimensional compact closed orientable smooth manifold $M$ and an $n$-dimensional integral homology class $[\Sigma]$ on $M$, with $1 \le n \le m-1$. Then does there exist an odd integer ...
Zhenhua Liu's user avatar
13 votes
1 answer
518 views

Impossibility of realizing codimension 1 homology classes by embedded non-orientable hypersurfaces

Suppose we have an $n+1$-dimensional compact closed oriented manifold $M$ and an $n$-dimensional integral homology class $[\Sigma]\in H_n(M,\mathbb{Z})$ on $M.$ Then is it true that $[\Sigma]$ mod $2$ ...
Zhenhua Liu's user avatar
4 votes
0 answers
206 views

Reference for a folklore theorem about h-cobordisms

I've seen referenced here that if $M$ and $N$ are closed topological $n$-manifolds and $f: \mathbb{R}\times M \to \mathbb{R}\times N$ is a homeomorphism, then $M$ and $N$ are h-cobordant. I know that ...
nick5435's user avatar
8 votes
0 answers
151 views

The James and Morse filtrations of homotopy groups

Denote by $JX$ the James construction on a path connected, well-pointed space $X$. This space is filtered by subspaces $X=J_1X\subseteq\dots\subseteq J_nX\subseteq\dots\subseteq JX$ and is the domain ...
Tyrone's user avatar
  • 5,596
0 votes
1 answer
376 views

Relation between trivial tangent bundle $\Leftrightarrow$ certain characteristic classes of tangent bundle vanish [closed]

We know that framing structure means the trivialization of tangent bundle of manifold $M$. string structure means the trivialization of Stiefel-Whitney class $w_1$, $w_2$ and half of the first ...
zeta's user avatar
  • 447
3 votes
0 answers
227 views

Classifying spaces beyond CW complexes

We know that for a reasonable topological group $G$ (say a compact Lie group) admits a classifying space for $G$-bundles within the category of countable CW complexes. That means, there is a space $BG$...
UVIR's user avatar
  • 803
4 votes
0 answers
116 views

Finding inverses of certain elements in the set of normal invariants of a smooth manifold

Let, $V$ denote the Stiefel manifold of 2-frames $V_{10,2}$ . Consider the the map $S_\text{diff} (V) \xrightarrow{\eta} N_\text{diff} (V) $ in the surgery exact sequence of a smooth manifold. . ...
Sagnik Biswas's user avatar
2 votes
0 answers
147 views

Extension of isotopies

In what follows $M$ will be a manifold (without boundary, for simplicity) and $C\subseteq M$ will denote a compact subset. In the paper Deformations of spaces of imbeddings Edwards and Kirby prove the ...
Tommaso Rossi's user avatar
1 vote
1 answer
192 views

Lie group framing and framed bordism

What is the definition of Lie group framing, in simple terms? Is the Lie group framing of spheres a particular type of Lie group framing? (How special is the Lie group framing of spheres differed ...
zeta's user avatar
  • 447
2 votes
0 answers
175 views

Minimal first Pontryagin class $p_1=1$?

From Hirzbuch theorem, the signature of 4-manifold $\sigma = p_1/3$ with the first Pontryagin class $p_1$. I know that the $\sigma=p_1/3 =1$ so $p_1=3$ for complex projective space $\mathbb{P}^2$. Is ...
zeta's user avatar
  • 447
9 votes
2 answers
621 views

Generalization of the sphere theorem in dimension at least 4

In 1956, Papakyriakopoulos proved Dehn's lemma, loop theorem and the sphere theorem. The proofs are based on a clever technique called "tower construction". Later, Whitehead, Shaprio, ...
Shijie Gu's user avatar
  • 2,083

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