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7 votes
1 answer
301 views

Fibers of generic smooth maps between manifolds of equal dimension

I have heard that the following is a "well-known" Claim. Let $M$ and $N$ be smooth manifolds with equal dimensions and $M$ compact. Then a generic smooth map $f\colon M\to N$ has finite ...
Matthew Kvalheim's user avatar
3 votes
1 answer
203 views

Cohomology of the complex of differential forms with Schwartz coefficients

Let $U$ be an open manifold (say an open subset of $\mathbb{R}^n$ for simplicity). Denote by $\mathscr{S}(U)$ the space of Schwartz functions on $U$. Schwartz functions are defined as usual to be ...
Grisha Taroyan's user avatar
4 votes
0 answers
116 views

Do any Legendrian knots in standard contact 3-space have big tubular neighborhoods?

Consider $\mathbb{R}^3$ with the standard contact structure $\ker(dz-y\,dx)$. According to the contact version of Weinstein's theorem, any Legendrian knot $L\subset \mathbb{R}^3$ has a tubular ...
Matthew Kvalheim's user avatar
11 votes
1 answer
701 views

Smooth map between oriented manifolds

Let $f: M\rightarrow N$ be a smooth map between smooth closed oriented connected manifolds of same dimension. Question: is it true that $f$ is smoothly homotopic to some smooth map $g: M\rightarrow N$...
GSM's user avatar
  • 223
4 votes
1 answer
198 views

Examples of hyperbolic manifolds of dimension $\geq$ 3 with disjoint totally geodesic hypersurfaces

I am hoping to find examples of compact hyperbolic manifolds with at least 2 disjoint totally geodesic hypersurfaces. Ideally, I would like examples in dimension at least 4, though 3-dimensional ...
ಠ_ಠ's user avatar
  • 6,025
29 votes
2 answers
2k views

Contractibility of the space of Jordan curves

Is the space of Jordan curves in $\textbf{R}^2$ contractible? In other words, is there a canonical or continuous way to deform each Jordan curve to the unit circle $\textbf{S}^1$. If the curves are ...
Mohammad Ghomi's user avatar
5 votes
0 answers
289 views

A certain kind of proof of the Hairy Ball Theorem

I'd just like to know if proofs of the Hairy Ball Theorem along the following lines are well-known or even somewhere in the literature. From a given vector field $V_1$ on $S^2$, form another, $V_2$, ...
David Feldman's user avatar
7 votes
1 answer
210 views

Recognizing sections up to isotopy

Let $E$, $B$ be smooth manifolds, $\pi\colon E\to B$ be a smooth fiber bundle, and $h:B\to E$ be a smooth embedding. I would like to learn what is known about the following Question. When does there ...
Matthew Kvalheim's user avatar
5 votes
1 answer
407 views

Making a submanifold transverse to a vector field by an isotopy

Let $M$ be a smooth manifold, $N\subset M$ be a smooth closed hypersurface not bounding a compact submanifold, and $X$ be a smooth nowhere-zero vector field on $M$. I would like to learn what is known ...
Matthew Kvalheim's user avatar
1 vote
1 answer
124 views

Relative equivariant Thom transversality

I'm looking for a reference for the following: Suppose that $G$ is a finite group, that $M$ is a smooth $G$-manifold, and that $A\subseteq M$ is a closed $G$-invariant subspace of $M$ such that the ...
Rick's user avatar
  • 55
13 votes
1 answer
1k views

Are there textbooks on differential geometry in the language of smooth sets or smooth derived stacks?

In differential geometry it is often natural to speak of infinite-dimensional manifolds (e.g., the manifold of mappings between two smooth manifolds). Different versions of generalized smooth spaces ...
15 votes
2 answers
1k views

Diffeomorphism group of the projective plane

First of all, I am interested in the general case of a non-orientable manifold but let's for now consider the projective plane $\mathbb{R}P^2.$ In short, I am curious if there is any relation between ...
Ilia's user avatar
  • 307
8 votes
1 answer
426 views

Orbifolds are Thom-Mather stratified spaces

Where can I find a proof of (or if it is even true) that an (effective) orbifold is a Thom-Mather stratified space? edit: after some search, I found the proof should be contained in either GIBSON, C....
UVIR's user avatar
  • 803
2 votes
2 answers
523 views

Orthogonal smooth vector field on a Riemannian manifold

Consider a compact Riemannian manifold $M$ with a smooth metric, and a smooth vector field $X$ on $M$. My question is, when can we construct another smooth vector field $Y$ on $M$ such that $Y$ is ...
SMS's user avatar
  • 1,407
1 vote
0 answers
170 views

Uniqueness of collar neighborhoods for non-compact boundary case in smooth setting

Let $M$ be a smooth manifold and let $f_0, f_1 \colon [0, 1] \times \partial M \to M$ be two smooth embeddings that are the identity map on $\partial M \times\{0\} = \partial M$ . If $\partial M$ is ...
Someone's user avatar
  • 265
1 vote
1 answer
243 views

Reference for non-parallel harmonic $k$-forms

I want to get some deep understanding on closed orientable Riemannian manifolds admitting $k$-forms ($k\geq 2$) $\omega$ that satisfices the following conditions: $$\nabla \omega\neq 0,\quad \Delta\...
C.F.G's user avatar
  • 4,195
16 votes
2 answers
1k views

Examples of Banach manifolds with function spaces as tangent spaces

I have recently been learning the theory of Banach manifolds through Serge Lang's book on Differential Manifolds. So far the objects seem rather interesting but my intuition always comes from the ...
proba_124's user avatar
  • 161
15 votes
6 answers
2k views

Any shortcuts to understanding the properties of the Riemannian manifolds which are used in the books on algebraic topology

I'm now attending a reading seminar on the algebraic topology. The seminar treats the book of Bott & Tu (Differential Forms in Algebraic Topology) and Milnor (Characteristic Classes). In those ...
gualterio's user avatar
  • 1,013
1 vote
0 answers
55 views

Projection of a real analytic manifold onto subspace is union of real analytic submanifolds

Let $M$ be a compact connected real analytic submanifold of the Euclidean space $\mathbb{R}^{n} \times \mathbb{R}$ and denote by $\pi : \mathbb{R}^{n} \times \mathbb{R} \rightarrow \mathbb{R}^{n}$ the ...
HugO's user avatar
  • 19
2 votes
2 answers
452 views

Reference for the divergence theorem for embedded $C^1$-submanifolds of $\mathbb R^d$ with boundary

I'm aware of Gauss's theorem (aka the divergence theorem) for compact subsets $K$ of $\mathbb R^d$ with "$C^1$-boundary"$^1$. I know that there are several generalizations of this theorem, ...
0xbadf00d's user avatar
  • 167
6 votes
1 answer
229 views

Does $\pi_k(M)\neq 0$ implies $\operatorname{ind}(\gamma) < k$?

Cross post from MSE. and sorry if this is an obvious question. Here is a line of proof of Theorem 1.15 from Brendle, Simon, Ricci flow and the sphere theorem, Graduate Studies in Mathematics 111. ...
C.F.G's user avatar
  • 4,195
1 vote
0 answers
61 views

Splitting formulas for spectral flows

I'm asking if there are splitting formulas for equivariant spectral flow and higher spectral flow (of Dai-Zhang) for paths of Dirac operators, concerning gluing together two smooth compact Spinc ...
Adnanne's user avatar
  • 11
4 votes
1 answer
486 views

Every _______ $d$-manifold has an $S$-structure

I am looking for some analogous nontrivial but known statements and references about statements of the form: Every _______ $d$-manifold has an $S$-structure. Here _______ is a placeholder for ...
wonderich's user avatar
  • 10.5k
5 votes
1 answer
248 views

Multisignature and homeomorphism type

In classical surgery theory, there is a map $$L_{n+1}(\pi_1M)\to S(M^n)$$ Element in $L_{n+1}(\pi_1M)$ is realized as surgery obstruction of a surgery problem to $M\times I$ with one boundary piece ...
student's user avatar
  • 101
14 votes
0 answers
312 views

An unpublished paper of Thurston about diffeomorphism groups

William Thurston has done many contributions in the field of diffeomorphism groups. But it seems that one of his papers entitled "On the Structure of the Group of Volume Preserving Diffeomorphisms" ...
XIII's user avatar
  • 747
5 votes
0 answers
261 views

The space of $k$ differential forms as a Fréchet space

Given a smooth manifold $M$, can define define seminorms on $\Gamma(U,\bigwedge^kT^{\ast}M)$ for $U$ a coordinate open set by the following: $p^{s}_L(u = \sum_{I}u_I dx_I) = \sup_{x \in M}\max_{|I|=p, ...
user142964's user avatar
15 votes
1 answer
612 views

Is the subgroup $\mathrm{Diff}(M,S)$ of $\mathrm{Diff}(M)$ a Lie subgroup?

Denote by $\mathrm{Diff}(M)$ the Lie group of smooth diffeomorphisms on a compact smooth manifold. Its Lie algebra can be viewed as the Lie algebra $\mathfrak X(M)$ of vector fields on $M$. Now, given ...
Hang's user avatar
  • 2,789
1 vote
0 answers
126 views

Flows commuting with Anosov flows and further reference request

Hello respected members of Mathoverflow. I was reading the paper "Flots d’Anosov dont les feuilletages stables sont différentiables" by Etienne Ghys and there was a statement which he remarked was ...
hakunamatata's user avatar
4 votes
0 answers
343 views

Riemannian metrics on a manifold with corners

For a smooth manifold with corners (although maybe there is no universally agreed definition of it), is there always a Riemannian metric making every face totally geodesic? Is there any reference ...
UVIR's user avatar
  • 803
6 votes
3 answers
561 views

Smale's theorem for $C^1$ diffeomorphisms of the sphere

In 1926 Kneser showed that homeomorphisms of $\mathbf{S}^2$ admit a retraction into the orthogonal group $O(3)$. Smale extended this result to Diffeomorphisms of $\mathbf{S}^2$ in 1958; however, in ...
Mohammad Ghomi's user avatar
11 votes
1 answer
940 views

Equivariant sections of fiber bundles

One of the fundamental facts in fiber bundle theory is the following result for existence and extension of sections (see Thm. 9 in this paper of Palais, and compare with Thm. 12.2 in Steenrod's book):...
Mohammad Ghomi's user avatar
3 votes
0 answers
74 views

Deforming a non-positively curved Riemannian manifold into a negatively curved one

Cheeger deformations can be used to deform some non-negatively curved Riemannian manifolds into positively curved manifolds (e.g., sectional curvatures strictly positve), see What is a Cheeger ...
B K's user avatar
  • 1,942
4 votes
1 answer
194 views

Chern numbers of almost complex manifolds

Suppose we are given two integer numbers $p$ and $q$ such that $p+q\equiv 0 \pmod{12}$. There is a result saying that for every such pair there exists a non necessarily connected almost complex ...
cll's user avatar
  • 2,305
4 votes
1 answer
304 views

Local product structure of determinantal variety

The variety $X_n$ of singular $n\times n$ real matrices is stratified by smooth strata $X_{n,k}$ where $k$ is the rank. Choose a rank $k$ matrix $A\in X_{n,k}$. Is there a local diffeomorphism sending ...
Mikhail Katz's user avatar
  • 16.6k
2 votes
0 answers
344 views

If the fibers of a submersion are connected, does it mean that any 2 sections are homotopic (locally on the base)?

Is the following fact known? If yes - what is the reference? Let $\phi:X\to Y$ be a submersion of smooth manifolds with connected fibers. Let $s_0,s_1:Y\to X$ be its (smooth) sections. Then, for any $...
Rami's user avatar
  • 2,639
5 votes
2 answers
569 views

3-sphere bundles over 4-sphere bound smooth disc bundles

I saw in the answer of this post: Is it true that all sphere bundles are boundaries of disk bundles? that a $S^3$-bundle over $S^4$ bounds a disc bundle over $S^4$ iff $O(4)\rightarrow Diff(S^3)$ is ...
Renato Moreira's user avatar
5 votes
0 answers
1k views

Prerequisites for reading Gregory Perelman's work

What are the prerequisites for understanding the work of Perelman concerning the Poincaré conjecture? I am referring to the last three papers here.
Alan's user avatar
  • 1,594
0 votes
1 answer
226 views

Marcel Berger's "Sur les groupes d'holonomie homogènes de variétés à connexion affine et des variétés riemanniennes."

I would appreciate any reference that contains either a translation or proof of the main theorem in this paper. Thank you in advanced.
Henry Zorrilla's user avatar
4 votes
1 answer
733 views

Reference request: Intrinsic definition of the strong Whitney topology on $\mathcal{C}^{\infty}(M,\mathbb{R})$ without using charts or jets

Let $M$ and $N$ be smooth manifolds. There is a description of the strong Whitney topology on $\mathcal{C}^{\infty}(M,N)$ in terms of partial derivative in charts (using locally finite sets of charts ...
Kathrin L.'s user avatar
6 votes
2 answers
2k views

How many metrics of constant curvature exist on a Riemannian surface?

I have been trying to determine the number of metrics of constant curvature on a surface of genus $n$, say $\Sigma$. For low values, the answer is clear, the moduli space is a point for the sphere, ...
Pax's user avatar
  • 841
1 vote
1 answer
265 views

Boundary components of a subsurface

Consider the following situation. Suppose we have a closed oriented Riemannian surface $ \Sigma $ and a connected open subset $ \Omega \subseteq \Sigma $ with a boundary, consisting of finitely many ...
Boggie Georgiev's user avatar
15 votes
2 answers
1k views

Is there a citeable reference for star-shaped open subsets of R^n being diffeomorphic to R^n?

A folk theorem says that star-shaped open subsets of R^n are diffeomorphic to R^n. Is there a citeable reference for a proof of this result? For the sake of being definite, let's say that “citeable” ...
Dmitri Pavlov's user avatar
0 votes
1 answer
201 views

Ambient isotopy of the diagonal submanifold in product space

Given a closed manifold $M^n$ and its $k$-fold product space $M^n\times\cdots\times M^n$,Can the diagonal submanifold $\Delta:=\{(m,\cdots,m)\in (M^n)^k\mid m\in M\}$ be isotopied to the submanifold $...
student's user avatar
  • 73
0 votes
1 answer
182 views

Surjectivity of "nice maps" from local properties

What tools are available from real algebraic geometry, analysis and topology to check surjectivity of a map $f:M_{1}\rightarrow\mathbb{R}^{d}$ from local properties and maybe function values? ...
warsaga's user avatar
  • 1,256
1 vote
1 answer
165 views

Can any bounded area defined by polynomial inequality in $\mathbb{R}^n$ be partitioned into simply connected finite area such that

Can any bounded area defined by polynomial inequality in $\mathbb{R}^n$ be partitioned into simply connected finite areas such that for each simply finite area there exist a diffeomorphic map that ...
XL _At_Here_There's user avatar
10 votes
2 answers
876 views

Are there nontrivial involutions of $S^7\times S^7$ with fixed point set homeo to $S^7$?

The group $\mathbb{Z}_2$ acts on $S^7\times S^7$ by switching the coordinates with fixed point set $\Delta(S^7\times S^7)\cong S^7$. I want to know whether there are some other $\mathbb{Z}_2$ actions ...
sara's user avatar
  • 888
39 votes
10 answers
4k views

Are there some other notions of "curvature" which measure how space curves?

I am learning differential geometry and have a few questions on curvature. -- Background: Gauss invented "Gauss curvature" to measure how surface curves. Riemann gives an ingenious generalization of ...
4 votes
2 answers
347 views

good reference on brieskorn manifold

I am trying to learn something on the Brieskorn manifold (interested in the topological property) Can the Mathoverflow Experts give me some good refencece (in English)? By the way,is there an ...
student's user avatar
  • 153
34 votes
1 answer
4k views

Strong Whitney embedding theorem for non-compact manifolds

$\newcommand{\RR}{\mathbb{R}}$The present question arises from some confusion on my part regarding the precise statement of the strong Whitney embedding theorem for non-compact manifolds. The strong ...
Ricardo Andrade's user avatar
26 votes
2 answers
1k views

Vector fields on $(4n+1)$-spheres

If $n$ is odd then $S^{n-1}$ doesn't admit a nowhere-vanishing vector field, and if $n$ is even then there does exist one (Hairy Ball Theorem). We can then ask, on $S^{n-1}$, what is the maximum ...
Chris Gerig's user avatar
  • 17.5k