Homotopy Type Theory homotopy groups of spheres > history (Rev #6, changes)

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Idea

The homotopy groups of spheres are a fundemental concept in algebraic topology. They tell you about homotopy classes of maps from spheres to other spheres which can be rephrased as the collection of different ways to attach a sphere to another sphere. The homotopy type of a CW complex is completely determined by the homotopy types of the attaching maps.

Here’s a quick reference for the state of the art on homotopy groups of spheres in HoTT. Everything listed here is also discussed on the page on Formalized Homotopy Theory.

In progress

$\pi_4(S^3)$

Guillaume has proved that there exists an $n$ such that $\pi_4(S^3)$ is $\mathbb{Z}_n$ . Given a computational interpretation, we could run this proof and check that $n$ is 2. Added June 2016: Brunerie now has a proof that $n=2$ , using cohomology calculations and a Gysin sequence argument.

At least one proof has been formalized

$\pi_3(S^2)$

Peter L. has constructed the Hopf fibration as a dependent type. Lots of people around know the construction, but I don’t know anywhere it’s written up. Here’s some Agda code with it in it.
Guillaume’s proof that the total space of the Hopf fibration is $S^3$ , together with $\pi_n(S^n)$ , imply this by a long-exact-sequence argument.
This was formalized in Lean in 2016.

$\pi_n(S^2)=\pi_n(S^3)$ for $n\geq 3$

This follows from the Hopf fibration and long exact sequence of homotopy groups.
It was formalized in Lean in 2016.

Freudenthal Suspension Theorem

Implies $\pi_k(S^n) = \pi_{k+1}(S^{n+1})$ whenever $k \le 2n - 2$

Peter’s encode/decode-style proof, formalized by Dan, using a clever lemma about maps out of two n-connected types.

$\pi_n(S^n)$

Dan and Guillaume’s encode/decode-style proof using iterated loop spaces (for single-loop presentation).
Guillaume’s proof (for suspension definition).
Dan’s proof from Freudenthal suspension theorem (for suspension definition).

$\pi_k(S^n)$ for $k \lt n$

Guillaume’s proof (see the book).
Dan’s encode/decode-style proof for pi_1(S^2) only.
Dan’s encode/decode-style proof for all k < n (for single-loop presentation).
Dan’s proof from Freudenthal suspension theorem (for suspension definition).

$\pi_2(S^2)$

Guillaume’s proof using the total space the Hopf fibration.
Dan’s encode/decode-style proof.

$\pi_1(S^1)$

Mike’s proof by contractibility of total space of universal cover (HoTT blog).
Dan’s encode/decode-style proof (HoTT blog). A paper mostly about the encode/decode-style proof, but also describing the relationship between the two.
Guillaume’s proof using the flattening lemma.

Revision on September 14, 2018 at 09:31:55 by Ali Caglayan. See the history of this page for a list of all contributions to it.

Homotopy Type Theory homotopy groups of spheres > history (Rev #6, changes)

Idea

In progress

π 4(S 3)\pi_4(S^3)

At least one proof has been formalized

π 3(S 2)\pi_3(S^2)

π n(S 2)=π n(S 3)\pi_n(S^2)=\pi_n(S^3) for n≥3n\geq 3

Freudenthal Suspension Theorem

π n(S n)\pi_n(S^n)

π k(S n)\pi_k(S^n) for k<nk \lt n

π 2(S 2)\pi_2(S^2)