Questions tagged [compact-manifolds]
For questions regarding the structure and properties of compact manifolds.
234
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Simplicial Homology Groups of Circle Wedge a Torus
Compute the simplicial homology groups of $S^1 \vee (S^1 \times S^1)$ in all dimensions.
I'm trying to practice simplicial homology, and want to make sure I understand at a technical level what's ...
0
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0
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36
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Compact Riemann surface is sequentially compact.
Now, I try to prove that;
M:a compact Riemann surface.
$\forall \{P_j\}_{j\in N}\subset M$
(sequence of points)
$\exists\{P_{j_k}\} _{k\in N}$
(subsequence of $\{P_j\}$)
s.t. the subsequence converge....
1
vote
1
answer
106
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Fréchet derivative of the total variation norm for measures on a manifold
Let $\Theta$ be a compact $d$-dimensional Riemannian manifold without boundary and $M(\Theta)$ (resp. $M_+(\Theta)$) denote the set of signed (resp. nonnegative) finite Borel measures on $\Theta$.
...
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1
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79
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$S^1\times S^2$ embedded in $\mathbb{R}^4$ [duplicate]
It's easy to embed $S^1\times S^2$ in $\mathbb{R}^5$, since $S^1\subset \mathbb{R}^2$ and $S^2\subset\mathbb{R}^3$, but $S^1\times S^2$ lives also in $\mathbb{R}^4$. How can we write the embedding map ...
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31
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Classify surface given by $abca^{-1}b^{-1}c^{-1}$
I'ven been solving problems from my Topology course, and don't understand something I saw while reading my solved examples. Here's a problem that will let me show my point:
Given $X$ a compact ...
1
vote
1
answer
19
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Proof that a compact surface has a tangent plane orthogonal to position
Given a compact surface $S$, is it true that $S$ has a tangent plane that is orthogonal to the position vector for at least one of its points?
I believe that the statement is true, but I'm having ...
2
votes
1
answer
123
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Subharmonic Functions on Closed Manifolds are Constant?
Apologies in advance if this question is trivial!
Let M be a closed, connected, oriented, n-dimensional, manifold without boundary.
Let $f$ be a smooth function on M where $\Delta f \geq 0$, where $\...
2
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1
answer
95
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Regularity of higher order elliptic problem on compact smooth manifolds with boundary
I have trouble in finding a source in the literature for the following result:
Let $\overline{M}$ be a compact smooth manifold of dimension $n \in \mathbb{N}$ with interior $M$ and non-empty boundary $...
2
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0
answers
54
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How to deal with boundary orientation in Exercise 16-5 from Lee's Introduction to Smooth Manifolds
16-5. Suppose $M$ and $N$ are oriented, compact, connected, smooth manifolds, and $F,G:M\to N$ are homotopic diffeomorphisms. Show that $F$ and $G$ are either both orientation-preserving or both ...
2
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79
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Extending an embedding with trivial normal bundle
Let $M^{m}$ and $N^{n}$ be $C^{\infty}$ compact manifold with boundary (eventually $\emptyset$) and let $j:M \to N$ be an embedding such that the normal bundle of the embedding $\nu(j)$ is trivial. ...
18
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1
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452
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Does there exist a compact submanifold of $\mathbb{R}^3$ whose fundamental group is $\mathbb{Z}^3$?
Does there exist a compact submanifold of $\mathbb{R}^3$ whose fundamental group is $\mathbb{Z}^3$ ?
The question in the title is a generalization of the question that really interests me:
Does ...
1
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1
answer
37
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Can a connected closed manifold strictly contain a closed manifold of the same dimension?
A connected closed manifold can contain another one as a proper subset: for instance, the $1$-sphere (circle) is contained in the $2$-sphere. Is it possible with manifolds of the same dimension?
...
3
votes
1
answer
73
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Irreducible triangulations of manifolds
Does there exist a closed Riemann manifold $M$, two distinct irreducible triangulations $S_1$ and $S_2$ of $M$, and a triangulation $T$ of $M$ such that there exists a sequence of edge contractions on ...
0
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1
answer
102
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Graph embeddings on nonorientable surfaces
If a finite graph $G$ can be embedded on an orientable surface of genus $n$, does this mean that it can be embedded on a nonorientable surface of genus $n$? Is the converse of this statement true?
2
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1
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82
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Prove that if $f:M\rightarrow\Bbb R$ is a scalar function over a 1-manifold M without boundary then $\int_M df=0$
Well James Munkres in the text Analysis on Manifolds prove the general Stoke's theorem for $k$-form when $k>1$ and then he proves it for $k=1$ only when the bounary of the Manifold is not empty and ...
2
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2
answers
108
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Manifolds with Euler characteristic equal to $\pm 1$
A compact connected smooth surface has Euler characteristic equal to $\pm 1$ if and only it is homeomorphic to the real projective plane or the connected sum of $3$ real projective planes. What are ...
4
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1
answer
184
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Can dimension of manifolds be understood similarly to dimension of schemes?
I’m only beginning to learn about schemes, but I know that at least in some cases, the dimension of a scheme (or variety) is 1 less than the length of the longest chain of irreducible closed subsets.
...
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43
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Smooth identification of the complement of a disk
I was wondering, to costruct a map from a compact smooth manifold $M$ of dimesion $n$ to the sphere $\mathbb{S}^{n}$ of degree $1$, apparently, the most common idea is to wrap a disk $D$, neighborhood ...
0
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0
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62
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Intuitive explanation of degree
I do understand the for $f : \mathbb{S}^{1} \longmapsto \mathbb{S}^{1}$ the degree of a map (thinking $f$ as a closed curve $\gamma$ defined on $[0,1]$) can be seen as "how many times a closed ...
1
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229
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degree of gauss map for genus $g$ torus in $\mathbb{R}^{3}$
I read that the degree of the gauss map for a $M$ compact orientable $2-$manifold (connected to use the fact that those are only the $g-$torus) in $\mathbb{R}^{3}$ should be $(1-g)$, which is $\frac{1}...
13
votes
5
answers
467
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Could exists a vector field on $\mathbb{S}^{2}$ with exactly $n$ zeroes?
I just started to learn index theory of tangent vector fields. I'm aware of two examples on the sphere $\mathbb{S}^{2}$ with exactly one zero, which, which are $F(x,y) = (1-x^2-y^2)\partial x$ thought ...
3
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1
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134
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Compact hyperbolic three-manifold - a question
In a recent paper the authors considered a spacetime described by
$$AdS_4 \times \Sigma_3 \times \mathcal{I}_r \times S^2$$
where $\mathcal{I}_r$ is an interval of the $r$-coordinate and the two-...
3
votes
2
answers
217
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Homotopy invariance for compactly supported cohomology
I can't find any reference regarding homotopy invariance for compactly supported cohomology and I wonder under which conditions the homotopy invariance still holds for compactly supported cohomology.
...
2
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1
answer
112
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Uniformization theorem for $C^k$ surfaces?
Does the uniformization theorem apply for surfaces that are $C^k$ ($k<\infty$)? I'm familiar with a couple of proofs of Uniformization (using Riemann-Roch, Ricci flow). But most of these proofs ...
1
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0
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31
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Is there an example of reducible compact 3-manifold with boundary that has no embedded incompressible two-sided surface?
There is a theorem stating that for irreducible compact manifolds with non-empty boundary there always exists such an embedded surface and I'm trying to understand why the irreducibility condition ...
2
votes
1
answer
57
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Making intuition rigorous that integral of some positive function on set should be monotone in the Haar measure of the set
Let $\mathcal{M}$ be a compact Riemannian manifold with geodesic distance function $d$ and $\Omega$ its volume measure.
Pick some $A,B\subseteq\mathcal{M}$ such that $\Omega(A)\ll\Omega(B)$, but: (1) $...
4
votes
1
answer
88
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Covering $\Bbb RP^\text{odd}\longrightarrow X$, what can be said about $X$?
I am looking for any argument related to the following fact, which may or may not be true.
Let $f:\Bbb RP^n\longrightarrow X$ be a covering space, where $n\geq 2$. Then, $X=\Bbb RP^n$.
Now, for $n=\...
1
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1
answer
125
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Compactification of log z Riemann Surface
I've been reading the 'Road to Reality' book of Roger Penrose and in the chapter on Riemann Surfaces, there is a note that we can compactify the log z Riemann Surface into a sphere. But I don't see ...
4
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2
answers
238
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What is the "natural homomorphism" in the definition of an *essential manifold*?
The following definition of "essential manifold" is in this wiki page:
A closed $n$-manifold $M$ is called essential if its fundamental class $[M]$ defines a nonzero element in the homology ...
0
votes
1
answer
183
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Simplicial complexes embedded on a compact manifold
Every finite graph can be embedded on some compact surface of sufficient genus such that no two edges cross. If $S$ is a finite simplicial complex of dimension $n$, can $S$ be embedded in some ...
0
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1
answer
47
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Can all connected graphs be embedded on a closed, compact 2-Manifold?
I know that there are spherical (planar) graphs such as $K_4$,and toroidal graphs such as $k_7$, but I was wondering if given any connected graph $G$, there exists a closed, compact 2-Manifold $M$ ...
4
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0
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121
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An orientable surface that cannot be embedded into $\Bbb R^3$?
By Whitney's embedding theorem, every 2-dimensional manifold (aka. a surface) can be embedded into $\Bbb R^4$.
Now, the Wikipedia page on that theorem states in this paragraph that we can even embedd ...
0
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0
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62
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intersection number on the boundary of a manifold
Let $F: W \to N$ be a smooth map, where $W$ is a compact manifold with boundary, $Z \subset N$ is closed and all manifolds are oriented. Also $\partial F \pitchfork Z$ and
$F^{-1}(Z)$ is a compact, ...
0
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1
answer
221
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The Sobolev embedding inequality on manifolds
Let $(M,g)$ be a (smooth) compact Riemanian manifold of dimension $n$. I expect that the following inequality is true for any smooth function $f$:
$$(\int_{M} |f|^{\beta})^{1/\beta} \leq C \;(\int_{M}...
2
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0
answers
98
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square root of a Riemannian metric
Let $(M,g)$ be a compact Riemannian manifold. Taking a smooth vector field $X$, there is an associated smooth function $$g(X,X):M\longrightarrow \mathbb{R}^+, \quad p\longmapsto g_p(X_p,X_p)\geq 0.$$ ...
0
votes
0
answers
90
views
Proof of classification theorem for compact surfaces
I am reading Massey's 'A basic coruse in Algebraic Topology'. In first chapter, he proved classification theorem for compact surfaces (compact connected 2-manifold). This theorem classifies compact ...
3
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0
answers
26
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Can one characterize compact smooth manifolds dynamically as such?
If $M$ is a smooth (connected) compact manifold, then it is known that any (smooth) vector field is complete, which means that the flow exists for all $t \in \mathbb{R}$.
What about the converse? If $...
2
votes
1
answer
95
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The relationship between the tubular neighbourhoods of two diffeomorphic manifolds
I'm a beginner of this complex area and want to use the differential geometry as a tool to solve some control problems. So my statement might be a little bit inaccurate...I will try my best.
There ...
1
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1
answer
44
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Is a pentagon a surface?
My question arise since a pentagon is homeomorphic to a closed disc. This last one is a surface with boundary.
However, a pentagon has vertices, so it seems isn't a 2-manifold.
If you consider a ...
1
vote
1
answer
185
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Collar neighborhoods of a topological manifold with boundary
For a $n$-manifold $M$ with nonempty boundary $\partial M$, a collar neighborhood of $\partial M$ in $M$ is an open neighborhood of $M$ homeomorphic to $\partial M \times [0,1)$ by a homeomorphism ...
2
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0
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80
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Does every closed manifold have a finite CW structure? [duplicate]
Hatcher's Algebraic Topology Corollary $3.37$ states that a closed manifold of odd dimension has Euler characteristic zero. But to consider about the Euler characteristic, every closed manifold must ...
0
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0
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28
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An example of a non-invariant measure on a compact Lie group
I would like to construct a non-invariant measure on a compact Lie group but I'm not sure what is allowed and what the consequences are. Take the simplest example of $SO(2)$. The unnormalized ...
2
votes
1
answer
187
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In what sense are these two invariant measures on $SU(2)$ proportional?
An element $g$ of $SU(2)$ is of the following form:
$$
g=\begin{bmatrix}
z_1 & z_2\\
-\bar{z}_2 & \bar{z}_1
\end{bmatrix},
$$
where $z_i$ are complex satisfying $|z_1|^2+|z_2|^2=1$. I can ...
1
vote
1
answer
96
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Cobordism of points
On the wiki page about cobordism, it is stated that the cobordism of oriented 0-dimensional manifolds is $\mathbb Z$. That seem surprising since One can always draw a line between two points.
I ...
3
votes
1
answer
120
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Integral in manifolds problem
Let $M$ be a orientable $n$ dimensional manifold. I'm trying to solve the following assertions:
Given a connected system of coordinates $(U,x_1,\cdots, x_n)$, prove that there exists a $n$-form $\...
1
vote
2
answers
56
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Triangulated manifold implies properties of simplicial complex?
I've been told that a compact $d$-dimensional manifold can be realized as a finite $d$-dimensional simplicial complex. Since any manifold is locally compact (I think), if it can be realized as a $d$-...
1
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1
answer
310
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Smooth map with no critical point
We know that given a manifold $M$ that is connected and compact, there exist a real function with a finite number of critical points, and with at least two.
Now if we consider a point $x\in M$, is it ...
1
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1
answer
101
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Can someone find the error in my proof that if X is compact then it's a manifold?
So, the question is let $X$ be a Hausdorff space such that each point of X has a neighborhood that is homeomorphic with an open subset of $\mathbb{R}^{m}$. Show that if $X$ is compact, then $X$ is an $...
1
vote
0
answers
42
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About a sub-manifold of $S^3$ whose boundary only consists of tori
I am reading a paper called "JSJ-decomposition of knot and link complements in $S^3$", written by Ryan Budney. My question does not concern the essence of the paper but a technical fact about 3-...
3
votes
2
answers
182
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smooth functions on compact Lie groups
Let $G$ be a compact matrix (Lie) group. If $$f:G\longrightarrow \mathbb{C}$$ is a smooth function I would like to know if there are finite number of smooth functions $$f_{k}, \hat{f}_{k}:G\...