parent
67bb9a196c
commit
16c5e3ab81
6 changed files with 94 additions and 19 deletions
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@ -52,21 +52,28 @@ const remarkAgda: RemarkPlugin = ({ base, publicDir }: Options) => {
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{},
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);
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if (childOutput.error || !existsSync(agdaOutFile)) {
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// Locate output file
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const directory = readdirSync(agdaOutDir);
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const outputFilename = directory.find((name) => name.endsWith(".md"));
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if (childOutput.status !== 0 || outputFilename === undefined) {
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throw new Error(
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`Agda error:
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`Agda output:
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Stdout:
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${childOutput.stdout}
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Stderr:
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${childOutput.stderr}`,
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${childOutput.stderr}
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`,
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{
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cause: childOutput.error,
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},
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);
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}
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const outputFile = join(agdaOutDir, outputFilename);
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// // TODO: Handle child output
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// console.error("--AGDA OUTPUT--");
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// console.error(childOutput);
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@ -106,7 +113,7 @@ const remarkAgda: RemarkPlugin = ({ base, publicDir }: Options) => {
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const htmlname = parse(path).base.replace(/\.lagda.md/, ".html");
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const doc = readFileSync(agdaOutFile);
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const doc = readFileSync(outputFile);
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// This is the post-processed markdown with HTML code blocks replacing the Agda code blocks
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const tree2 = fromMarkdown(doc);
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@ -6,13 +6,23 @@ tags: [algebraic-topology, hott]
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draft: true
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---
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<details>
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<summary>Imports</summary>
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```
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{-# OPTIONS --cubical #-}
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open import Cubical.Foundations.Prelude
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open import Data.Nat
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open import Data.Bool
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{-# OPTIONS --cubical --allow-unsolved-metas #-}
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module 2024-09-15-circle-is-a-suspension-over-booleans.index where
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open import Cubical.Core.Primitives
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open import Cubical.Foundations.Function
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open import Cubical.Foundations.Isomorphism
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open import Cubical.Foundations.Equiv.Base
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open import Cubical.HITs.S1.Base
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open import Data.Bool.Base
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open import Data.Nat.Base
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```
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</details>
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One of the simpler yet still very interesting space in algebraic topology is the **circle**.
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Analytically, a circle can described as the set of all points that satisfy:
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@ -61,10 +71,6 @@ $$
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It would be nice to have an iterative definition of spheres; one that doesn't rely on us using our intuition to form new ones.
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Ideally, it would be a function $S^n : \mathbb{N} \rightarrow \mathcal{U}$, where we could plug in an $n$ of our choosing.
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```
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S_ : ℕ → Type
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```
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For an iterative definition, we'd like some kind of base case.
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What's the base case of spheres?
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What is a $0$-sphere?
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@ -73,12 +79,65 @@ If we take our original analytic definition of spheres and plug in $0$, we find
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The space of solutions is just a space with two elements!
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In other words, the type of booleans is actually the $0$-sphere, $S^0$.
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```
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S zero = Bool
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```
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![](./1.png)
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How about the iterative case? How can we take an $n$-sphere and get an $(n+1)$-sphere?
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This is where we need something called a _suspension_.
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Suspensions are a form of higher inductive type (HIT). It can be defined like this:
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```
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S (suc n) = Bool
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data Susp (A : Type) : Type where
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north : Susp A
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south : Susp A
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merid : A → north ≡ south
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```
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Intuitively, you take the entirety of the type $A$, and imagine it as some kind of plane.
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Then, add two points, $\mathsf{north}$ and $\mathsf{south}$, to the top and bottom respectively.
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Now, each original point in $A$ defines a _path_ between $\mathsf{north}$ and $\mathsf{south}$.
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![](./susp.png)
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It may not be too obvious, but the circle $S^1$, can be represented as a suspension of the booleans $S^0$.
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This is presented as Theorem 6.5.1 in the [HoTT book]. I'll go over it briefly here.
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[hott book]: https://homotopytypetheory.org/book/
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The main idea is to consider the paths generated by both the $\mathsf{true}$ and the $\mathsf{false}$ points to add up to a single $\mathsf{loop}$.
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Here's a visual guide:
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![](./boolsusp.png)
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We can write functions going back and forth:
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```
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Σ2→S¹ : Susp Bool → S¹
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Σ2→S¹ north = base -- map the north point to the base point
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Σ2→S¹ south = base -- also map the south point to the base point
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Σ2→S¹ (merid false i) = loop i -- for the path going through false, let's map this to the loop
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Σ2→S¹ (merid true i) = base -- for the path going through true, let's map this to refl
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S¹→Σ2 : S¹ → Susp Bool
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S¹→Σ2 base = north
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S¹→Σ2 (loop i) = {! !}
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```
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Now, to finish showing the equivalence, we need to prove that these functions concatenate into the identity in both directions:
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```
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rightInv : section Σ2→S¹ S¹→Σ2
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rightInv = {! !}
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leftInv : retract Σ2→S¹ S¹→Σ2
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leftInv = {! !}
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```
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And this gives us our equivalence!
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```
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Σ2≃S¹ : Susp Bool ≃ S¹
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Σ2≃S¹ = isoToEquiv (iso Σ2→S¹ S¹→Σ2 rightInv leftInv)
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```
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In fact, we can also show that the $2$-sphere is the suspension of the $1$-sphere.
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@ -7,6 +7,7 @@ import Timestamp from "../../components/Timestamp.astro";
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import { getImage } from "astro:assets";
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import TocWrapper from "../../components/TocWrapper.astro";
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import TagList from "../../components/TagList.astro";
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import portrait from "../../assets/self.png";
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export async function getStaticPaths() {
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const posts = await getCollection("posts");
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@ -22,7 +23,7 @@ const post = Astro.props;
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const { Content, remarkPluginFrontmatter, headings } = await post.render();
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const { title, toc, heroImage: heroImagePath, heroAlt, draft } = post.data;
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let heroImage;
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let heroImage = undefined;
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if (heroImagePath) {
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heroImage = await getImage({ src: heroImagePath });
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}
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@ -40,8 +41,16 @@ const excerpt = remarkPluginFrontmatter.excerpt?.replaceAll("\n", "");
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<meta slot="head" property="og:description" content={excerpt} />
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<meta slot="head" property="og:type" content="article" />
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<meta slot="head" property="og:locale" content="en_US" />
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{heroImage && <meta slot="head" property="og:image" content={heroImage.src} />}
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{heroImage ?
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<>
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<meta slot="head" property="og:image" content={heroImage.src} />
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{heroAlt && <meta slot="head" property="og:image:alt" content={heroAlt} />}
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</>
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:
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<>
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<meta slot="head" property="og:image" content={portrait.src} />
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</>
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}
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<meta slot="head" property="keywords" content={post.data.tags.join(", ")} />
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<meta slot="head" property="description" content={excerpt} />
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