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The study of differentiable manifolds and differentiable maps. One fundamental problem is that of classifying manifolds up to diffeomorphism. Differential topology is what Poincaré understood as topology or “analysis situs”.

2 votes

Existence of a spin map from a standard sphere to any closed Riemaninan manifold with nonneg...

For now, let $M$ be any closed oriented $n$-dimensional manifold, and $f : S^m \to M$ a smooth map. First suppose $k \geq 1$. Since $m = n + 4k > 2$, we have $H^2(S^m; \mathbb{Z}_2) = 0$, and hence $f …
Michael Albanese's user avatar
11 votes

A question about the existence of spin maps

If $M$ and $N$ are spin, then every map between them is a spin map. In particular, there exist spin maps $M \to N$ of degree zero. If $M$ is spin and $N$ is not spin, then $f : M \to N$ is a spin map …
Michael Albanese's user avatar
6 votes
Accepted

Does composition on the right by a volume-preserving diffeomorphism preserve homotopy class?

Let $X$ be a smooth, compact, orientable manifold and let $\omega$ be a choice of volume form. On $X\times X$, we have the natural volume form $\sigma = \pi_1^*\omega \wedge \pi_2^*\omega$ where $\pi_ …
Michael Albanese's user avatar
7 votes
Accepted

Stable normal bundle and immersions

This follows from obstruction theory; also see this answer. If $E \to X$ is a rank $r$ real vector bundle over a CW complex $X$, then the obstructions to finding a nowhere-zero section lie in $H^i(X; …
Michael Albanese's user avatar
18 votes
Accepted

Converse to Hopf degree theorem

See the second half of the answer for a complete characterisation of closed orientable manifolds with the Hopf property. Note that $X$ having the Hopf property is equivalent to the injectivity of $\d …
Michael Albanese's user avatar
5 votes
Accepted

Quantitative results for stabilizing tangent bundles of homology spheres

If $E \to X$ is a rank $r$ real vector bundle, then it is classified by a map $X \to BO(r)$. The existence of an isomorphism $E \cong E_0\oplus\underline{\mathbb{R}}$ (equivalently, the existence of a …
Michael Albanese's user avatar
4 votes

Atiyah-Bott-Shapiro generalization to $U(n) \to ({Spin(2n) \times U(1)})/{\mathbf{Z}/4}$ for...

Let $\omega = e_1e_2\dots e_{2n-1}e_{2n}$. For $n > 1$, the center of $Spin(2n)$ is $Z(Spin(2n)) = \{\pm 1, \pm\omega\}$. Note that $\omega^2 = (-1)^n$, so $$Z(Spin(2n)) = \begin{cases} \langle -1, \ …
Michael Albanese's user avatar
10 votes
Accepted

The maximum number of vertical independent vector fields on the tangent bundle

I will address the first version of your question (i.e. no conditions on commuting flows). A vector bundle $E \to B$ admits $k$ linearly independent vector fields if and only if $E$ has a subbundle is …
Michael Albanese's user avatar
32 votes
Accepted

If two smooth manifolds are homeomorphic, then their stable tangent bundles are vector bundl...

The result you are hoping for is in fact false. In section 9 of Microbundles: Part I, Milnor constructs an open set $U \subset \mathbb{R}^m$. With its standard smooth structure, the (stable) tangent b …
Michael Albanese's user avatar
23 votes

If $M$ and $N$ are closed and $M\times S^1$ is diffeomorphic to $N\times S^1$, is it true th...

The manifolds $M$ and $N$ may not even be homotopy equivalent! In Compact Flat Riemannian Manifolds: I, Charlap showed that there are two closed flat manifolds $M$ and $N$ of the same dimension which …
Michael Albanese's user avatar
9 votes
Accepted

To what extent is a vector bundle on a manifold with boundary determined by its restriction ...

As I indicated in my comment, the inclusion $\iota : M_0 \to M$ is a homotopy equivalence. This can be shown using the fact that the boundary $\partial M$ has a collar neighbourhood; it then boils dow …
Michael Albanese's user avatar
8 votes

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

In this paper, Aleksandar Milivojevic and I prove that every orientable manifold of dimension $\leq 7$ is spin$^h$. We also construct, for every $d \geq 8$, infinitely many homotopy types of closed, s …
Michael Albanese's user avatar
9 votes
Accepted

Index of Dirac operator and Chern character of symmetric product twisting bundle

Your first question can be answered by using the splitting principle. If $V \to X$ is a complex vector bundle of rank two, then $c_1(S^3V) = 6c_1(V)$ and $c_2(S^3V) = 11c_1(V)^2 + 10c_2(V)$. Pr …
Michael Albanese's user avatar
3 votes

A topological consequence of Riemann-Roch in the almost complex case

I just wanted to point out how this question is related to (spin${}^c$) Dirac operators and their indicies since this was alluded to in the comments to the question. Let $(M, g)$ be an $2n$-dimension …
Michael Albanese's user avatar
15 votes

Realization problem for Betti numbers

Suppose we are given non-negative integers $b_0, b_1, \dots, b_n$ with $b_k = b_{n-k}$. Is there a closed orientable manifold $M$ with $b_i(M) = b_i$? First we need $b_0 = b_n \geq 1$. It is enough to …
Michael Albanese's user avatar

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