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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”.

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
4 votes
Accepted

Under what condition is a fiber bundle cobordant to the trivial bundle?

Here are three special cases where it is always true: Sphere bundles of vector bundles. If $E \to B$ is a vector bundle and $S(E) \to B$ is the associated sphere bundle, then $S(E)$ bounds the disc 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
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
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
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
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
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
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
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
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
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
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
12 votes

Chern classes of generators of $K(S^{2n})$

Note that $K(S^{2n}) = \mathbb{Z}\times\mathbb{Z}$ has many different sets of generators and these can have different Chern classes, so the question doesn't have a well-defined answer. For one particu …
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

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