cube/zenzicubi.co
cube/zenzicubi.co
1
0
Fork 0
Code Issues Pull Requests Actions Packages Projects Releases Wiki Activity

update links following renaming

Browse Source
This commit is contained in:
queue-miscreant 2025-08-08 04:11:37 -05:00
parent baf09ec891
commit b4ed75e95c
13 changed files with 94 additions and 96 deletions
Show Stats Download Patch File Download Diff File Expand all files Collapse all files

114
_quarto.yml
View File

@ -9,15 +9,15 @@ website:
left: left:
- text: "Math" - text: "Math"
menu: menu:
- ./posts/polycount/index.qmd - ./posts/math/polycount/index.qmd
- ./posts/pentagons/index.qmd - ./posts/math/pentagons/index.qmd
- ./posts/chebyshev/index.qmd - ./posts/math/chebyshev/index.qmd
- ./posts/stereo/index.qmd - ./posts/math/stereo/index.qmd
- ./posts/permutations/index.qmd - ./posts/math/permutations/index.qmd
- ./posts/type-algebra/index.qmd - ./posts/math/type-algebra/index.qmd
- ./posts/number-number/index.qmd - ./posts/math/number-number/index.qmd
- ./posts/finite-field/index.qmd - ./posts/math/finite-field/index.qmd
- ./posts/misc/index.qmd - ./posts/math/misc/index.qmd
right: right:
- ./about/index.qmd - ./about/index.qmd
- icon: github - icon: github
@ -32,123 +32,123 @@ website:
contents: contents:
- section: "Topics" - section: "Topics"
contents: contents:
- ./posts/polycount/index.qmd - ./posts/math/polycount/index.qmd
- ./posts/pentagons/index.qmd - ./posts/math/pentagons/index.qmd
- ./posts/chebyshev/index.qmd - ./posts/math/chebyshev/index.qmd
- ./posts/stereo/index.qmd - ./posts/math/stereo/index.qmd
- ./posts/permutations/index.qmd - ./posts/math/permutations/index.qmd
- ./posts/type-algebra/index.qmd - ./posts/math/type-algebra/index.qmd
- ./posts/number-number/index.qmd - ./posts/math/number-number/index.qmd
- ./posts/finite-field/index.qmd - ./posts/math/finite-field/index.qmd
- ./posts/misc/index.qmd - ./posts/math/misc/index.qmd
- id: misc-sidebar - id: misc-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "Miscellaneous" - section: "Miscellaneous"
contents: contents:
- ./posts/misc/platonic-volume/index.qmd - ./posts/math/misc/platonic-volume/index.qmd
- ./posts/misc/infinitesimals/index.qmd - ./posts/math/misc/infinitesimals/index.qmd
- id: polycount-sidebar - id: polycount-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "Polynomial Counting" - section: "Polynomial Counting"
href: ./posts/polycount/index.qmd href: ./posts/math/polycount/index.qmd
contents: contents:
- text: "Part 1: A primer" - text: "Part 1: A primer"
href: ./posts/polycount/1/index.qmd href: ./posts/math/polycount/1/index.qmd
- text: "Part 2: Binary and beyond" - text: "Part 2: Binary and beyond"
href: ./posts/polycount/2/index.qmd href: ./posts/math/polycount/2/index.qmd
- text: "Part 3: The third degree" - text: "Part 3: The third degree"
href: ./posts/polycount/3/index.qmd href: ./posts/math/polycount/3/index.qmd
- text: "Part 4: Two twos" - text: "Part 4: Two twos"
href: ./posts/polycount/4/index.qmd href: ./posts/math/polycount/4/index.qmd
contents: contents:
- text: "Appendix" - text: "Appendix"
href: ./posts/polycount/4/appendix/index.qmd href: ./posts/math/polycount/4/appendix/index.qmd
- text: "Part 5: Pentamerous multiplication" - text: "Part 5: Pentamerous multiplication"
href: ./posts/polycount/5/index.qmd href: ./posts/math/polycount/5/index.qmd
- section: 2D - section: 2D
contents: contents:
- text: "Part 1: Lines, leaves, and sand" - text: "Part 1: Lines, leaves, and sand"
href: ./posts/polycount/sand-1/index.qmd href: ./posts/math/polycount/sand-1/index.qmd
- text: "Part 2: Reorienting Polynomials" - text: "Part 2: Reorienting Polynomials"
href: ./posts/polycount/sand-2/index.qmd href: ./posts/math/polycount/sand-2/index.qmd
- id: pentagons-sidebar - id: pentagons-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "12 Pentagons" - section: "12 Pentagons"
href: ./posts/pentagons/index.qmd href: ./posts/math/pentagons/index.qmd
contents: contents:
- text: "Part 1" - text: "Part 1"
href: ./posts/pentagons/1/index.qmd href: ./posts/math/pentagons/1/index.qmd
- text: "Part 2" - text: "Part 2"
href: ./posts/pentagons/2/index.qmd href: ./posts/math/pentagons/2/index.qmd
- text: "Part 3" - text: "Part 3"
href: ./posts/pentagons/3/index.qmd href: ./posts/math/pentagons/3/index.qmd
- id: chebyshev-sidebar - id: chebyshev-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "Generating Polynomials" - section: "Generating Polynomials"
href: ./posts/chebyshev/index.qmd href: ./posts/math/chebyshev/index.qmd
contents: contents:
- text: "Part 1: Regular Constructability" - text: "Part 1: Regular Constructability"
href: ./posts/chebyshev/1/index.qmd href: ./posts/math/chebyshev/1/index.qmd
- text: "Part 2: Ghostly Chains" - text: "Part 2: Ghostly Chains"
href: ./posts/chebyshev/2/index.qmd href: ./posts/math/chebyshev/2/index.qmd
- text: "Extra: Legendary" - text: "Extra: Legendary"
href: ./posts/chebyshev/extra/index.qmd href: ./posts/math/chebyshev/extra/index.qmd
- id: stereography-sidebar - id: stereography-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "Algebraic Stereography" - section: "Algebraic Stereography"
href: ./posts/stereo/index.qmd href: ./posts/math/stereo/index.qmd
contents: contents:
- ./posts/stereo/1/index.qmd - ./posts/math/stereo/1/index.qmd
- ./posts/stereo/2/index.qmd - ./posts/math/stereo/2/index.qmd
- id: permutations-sidebar - id: permutations-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "A Game of Permutations" - section: "A Game of Permutations"
href: ./posts/permutations/index.qmd href: ./posts/math/permutations/index.qmd
contents: contents:
- text: "Part 1" - text: "Part 1"
href: ./posts/permutations/1/index.qmd href: ./posts/math/permutations/1/index.qmd
- text: "Part 2" - text: "Part 2"
href: ./posts/permutations/2/index.qmd href: ./posts/math/permutations/2/index.qmd
- text: "Part 3" - text: "Part 3"
href: ./posts/permutations/3/index.qmd href: ./posts/math/permutations/3/index.qmd
- text: "Appendix" - text: "Appendix"
href: ./posts/permutations/appendix/index.qmd href: ./posts/math/permutations/appendix/index.qmd
- id: type-algebra-sidebar - id: type-algebra-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "Type Algebra and You" - section: "Type Algebra and You"
href: ./posts/type-algebra/index.qmd href: ./posts/math/type-algebra/index.qmd
contents: contents:
- text: "Part 1: Basics" - text: "Part 1: Basics"
href: ./posts/type-algebra/1/index.qmd href: ./posts/math/type-algebra/1/index.qmd
- text: "Part 2: A Fixer-upper" - text: "Part 2: A Fixer-upper"
href: ./posts/type-algebra/2/index.qmd href: ./posts/math/type-algebra/2/index.qmd
- text: "Part 3: Combinatorial Types" - text: "Part 3: Combinatorial Types"
href: ./posts/type-algebra/3/index.qmd href: ./posts/math/type-algebra/3/index.qmd
- id: number-number-sidebar - id: number-number-sidebar
style: "floating" style: "floating"
contents: contents:
- section: "Numbering Numbers" - section: "Numbering Numbers"
href: ./posts/number-number/index.qmd href: ./posts/math/number-number/index.qmd
contents: contents:
- text: "From 0 to ∞" - text: "From 0 to ∞"
href: ./posts/number-number/1/index.qmd href: ./posts/math/number-number/1/index.qmd
- text: "Ordering Obliquely" - text: "Ordering Obliquely"
href: ./posts/number-number/2/index.qmd href: ./posts/math/number-number/2/index.qmd
- id: finite-field-sidebar - id: finite-field-sidebar
style: "floating" style: "floating"
@ -157,16 +157,16 @@ website:
href: ./posts/finite-field/index.qmd href: ./posts/finite-field/index.qmd
contents: contents:
- text: "Part 1: Preliminaries" - text: "Part 1: Preliminaries"
href: ./posts/finite-field/1/index.qmd href: ./posts/math/finite-field/1/index.qmd
- text: "Part 2: Matrix Boogaloo" - text: "Part 2: Matrix Boogaloo"
href: ./posts/finite-field/2/index.qmd href: ./posts/math/finite-field/2/index.qmd
contents: contents:
- text: "Appendix" - text: "Appendix"
href: ./posts/finite-field/2/extra/index.qmd href: ./posts/math/finite-field/2/extra/index.qmd
- text: "Part 3: Roll a d20" - text: "Part 3: Roll a d20"
href: ./posts/finite-field/2/index.qmd href: ./posts/math/finite-field/2/index.qmd
- text: "Part 5: The Power of Forgetting" - text: "Part 5: The Power of Forgetting"
href: ./posts/finite-field/2/index.qmd href: ./posts/math/finite-field/2/index.qmd
format: format:
html: html:

18
index.qmd
View File

@ -2,14 +2,14 @@
title: "Posts" title: "Posts"
listing: listing:
contents: contents:
- posts/polycount/*/index.* - posts/math/polycount/*/index.*
- posts/pentagons/*/index.* - posts/math/pentagons/*/index.*
- posts/chebyshev/*/index.* - posts/math/chebyshev/*/index.*
- posts/stereo/*/index.* - posts/math/stereo/*/index.*
- posts/permutations/*/index.* - posts/math/permutations/*/index.*
- posts/type-algebra/*/index.* - posts/math/type-algebra/*/index.*
- posts/number-number/*/index.* - posts/math/number-number/*/index.*
- posts/finite-field/*/index.* - posts/math/finite-field/*/index.*
- posts/misc/*/index.* - posts/math/misc/*/index.*
sort: "date desc" sort: "date desc"
--- ---

7
interactive/p-adics/index.qmd
View File

@ -27,9 +27,10 @@ Each term of the series is weighted by a geometrically decreasing coefficient *c
$$ $$
[...d_2 d_1 d_0]_p \mapsto e^{2\pi i [d_0] / p} [...d_2 d_1 d_0]_p \mapsto e^{2\pi i [d_0] / p}
+ c e^{2\pi i [d_1 d_0] / p^2} + c e^{2\pi i [d_1 d_0] / p^2}
+ c^2 e^{2\pi i [d_2 d_1 d_0] / p^2} + c^2 e^{2\pi i [d_2 d_1 d_0] / p^2}
+ ... \\ + ...
\\
f_N(d; p) = \sum_{n = 0}^N c^n e^{2\pi i \cdot [d_{n:0}]_p / p^{n + 1}} f_N(d; p) = \sum_{n = 0}^N c^n e^{2\pi i \cdot [d_{n:0}]_p / p^{n + 1}}
$$ $$

11
posts/math/chebyshev/1/index.qmd
View File

@ -38,7 +38,7 @@ from sympy.abc import z
``` ```
[Recently](/posts/misc/platonic-volume), I used coordinate-free geometry to derive [Recently](/posts/math/misc/platonic-volume), I used coordinate-free geometry to derive
the volumes of the Platonic solids, a problem which was very accessible to the ancient Greeks. the volumes of the Platonic solids, a problem which was very accessible to the ancient Greeks.
On the other hand, they found certain problems regarding which figures can be constructed via On the other hand, they found certain problems regarding which figures can be constructed via
compass and straightedge to be very difficult. For example, they struggled with problems compass and straightedge to be very difficult. For example, they struggled with problems
@ -742,16 +742,13 @@ My initial jumping off point for writing this article was completely different.
However, in the process of writing, its share of the article shrank and shrank until its However, in the process of writing, its share of the article shrank and shrank until its
introduction was only vaguely related to what preceded it. introduction was only vaguely related to what preceded it.
But alas, the introduction via geometric constructions flows better coming off my But alas, the introduction via geometric constructions flows better coming off my
[post about the Platonic solids](/posts/misc/platonic-volume). [post about the Platonic solids](/posts/math/misc/platonic-volume).
Also, it reads better if I rely less on "if you search for this sequence of numbers" Also, it reads better if I rely less on "if you search for this sequence of numbers"
and more on how to interpret the definition. and more on how to interpret the definition.
Consider reading [the follow-up](../2) to this post if you're interested in another way Consider reading [the follow-up](../2) to this post if you're interested in another way
one can obtain the Chebyshev polynomials. one can obtain the Chebyshev polynomials.
I have since rederived the Chebyshev polynomials without the complex exponential,
which you can read about in [this post](/posts/math/stereo/2).
Diagrams created with GeoGebra. Diagrams created with GeoGebra.
<!--
Update: I have since rederived the Chebyshev polynomials without the complex exponential,
which you can read about in [this post]().
-->

4
posts/math/finite-field/2/extra/index.qmd
View File

@ -1,5 +1,5 @@
--- ---
title: "Exploring Finite Fields, Part 2 (Extra)" title: "Exploring Finite Fields, Part 2 Appendix"
description: | description: |
Additional notes about polynomial evaluation. Additional notes about polynomial evaluation.
format: format:
@ -280,7 +280,7 @@ $$
\end{gather*} \end{gather*}
$$ $$
The "[path swaps](/posts/permutations/1/)" shown commute only the adjacent elements. The "[path swaps](/posts/math/permutations/1/)" shown commute only the adjacent elements.
By contrast, the permutation $(0 ~ 2)$ commutes *Ξ*~0~ past both *Ξ*~1~ and *Ξ*~2~. By contrast, the permutation $(0 ~ 2)$ commutes *Ξ*~0~ past both *Ξ*~1~ and *Ξ*~2~.
But since we already know *Ξ*~0~ and *Ξ*~1~ commute by the above list, But since we already know *Ξ*~0~ and *Ξ*~1~ commute by the above list,
we learn at this step that *Ξ*~0~ and *Ξ*~2~ commute. we learn at this step that *Ξ*~0~ and *Ξ*~2~ commute.

2
posts/math/finite-field/3/index.qmd
View File

@ -281,7 +281,7 @@ If you've studied enough group theory, you know that there are two groups of ord
Since the former group has order-6 elements, but none of these matrices are of order 6, Since the former group has order-6 elements, but none of these matrices are of order 6,
the matrix group must be isomorphic to the latter. the matrix group must be isomorphic to the latter.
Since the group is small, it's not too difficult to construct an isomorphism between the two. Since the group is small, it's not too difficult to construct an isomorphism between the two.
Writing the elements of *S*~3~ in [cycle notation](/posts/permutations/1/), we have: Writing the elements of *S*~3~ in [cycle notation](/posts/math/permutations/1/), we have:
$$ $$
\begin{gather*} \begin{gather*}

18
posts/math/index.qmd
View File

@ -2,14 +2,14 @@
title: "Posts by topic" title: "Posts by topic"
listing: listing:
contents: contents:
- posts/polycount/index.* - /posts/math/polycount/index.*
- posts/pentagons/index.* - /posts/math/pentagons/index.*
- posts/chebyshev/index.* - /posts/math/chebyshev/index.*
- posts/stereo/index.* - /posts/math/stereo/index.*
- posts/permutations/index.* - /posts/math/permutations/index.*
- posts/type-algebra/index.* - /posts/math/type-algebra/index.*
- posts/number-number/index.* - /posts/math/number-number/index.*
- posts/finite-field/index.* - /posts/math/finite-field/index.*
- posts/misc/*/index.* - /posts/math/misc/*/index.*
sort: false sort: false
--- ---

2
posts/math/misc/platonic-volume/index.qmd
View File

@ -361,7 +361,7 @@ It is half the length of the diagonal, so the ratio of a diagonal to a side is a
To make calculations easier, some conversions will be made to base *φ*, or phinary. To make calculations easier, some conversions will be made to base *φ*, or phinary.
If you are not familiar already with phinary, I have already written at length about it [here]( If you are not familiar already with phinary, I have already written at length about it [here](
/posts/polycount/1 /posts/math/polycount/1
). ).
To calculate the apothem, we can calculate the sagitta *s* and height *l* by similar triangles. To calculate the apothem, we can calculate the sagitta *s* and height *l* by similar triangles.

2
posts/math/number-number/1/index.qmd
View File

@ -689,7 +689,7 @@ Personally, I like this definition a bit better, if only because it matches othe
For example, For example,
- In topology, it's common to show that this interval is homeomorphic to the entire real line - In topology, it's common to show that this interval is homeomorphic to the entire real line
- It's similar to the [rational functions which appear in stereography](/posts/stereo/1/), - It's similar to the [rational functions which appear in stereography](/posts/math/stereo/1/),
which continue to infinity instead of being periodic which continue to infinity instead of being periodic
- It showcases how the Stern-Brocot tree sorts rational numbers by complexity better - It showcases how the Stern-Brocot tree sorts rational numbers by complexity better

2
posts/math/permutations/3/index.qmd
View File

@ -89,7 +89,7 @@ At least our beloved paths are left untouched, since $L(P_n) = P_{n-1}$.
### Coxeter Diagrams ### Coxeter Diagrams
As it turns out, these restrictions are significant and produce some very deep mathematical objects, As it turns out, these restrictions are significant and produce some very deep mathematical objects,
known as *Coxeter diagrams* (named for the same Coxeter as in [Goldberg-Coxeter](/posts/pentagons/1)). known as *Coxeter diagrams* (named for the same Coxeter as in [Goldberg-Coxeter](/posts/math/pentagons/1)).
In this domain, the aforementioned rules about vertices and edges apply: In this domain, the aforementioned rules about vertices and edges apply:
each vertex corresponds to an order 2 element and each edge signifies each vertex corresponds to an order 2 element and each edge signifies
that the product of two elements has order 3. that the product of two elements has order 3.

2
posts/math/polycount/4/appendix/index.qmd
View File

@ -234,7 +234,7 @@ In fact, since the expansions are in binary or (balanced) ternary, the integers
be a subset of the 2-adics or 3-adics. be a subset of the 2-adics or 3-adics.
Still, I wanted to see what these numbers actually "look" like, so I whipped up an interactive diagram. Still, I wanted to see what these numbers actually "look" like, so I whipped up an interactive diagram.
You should definitely see [this page](/interactive/adic/) for more information, but You should definitely see [this page](/interactive/p-adics/) for more information, but
the gist is that *p*-adics can be sent into the complex plane in a fractal-like way. the gist is that *p*-adics can be sent into the complex plane in a fractal-like way.

4
posts/math/polycount/4/appendix/showAdicWithKappa.ojs
View File

@ -18,7 +18,7 @@ adicExpansionsQuotRem = FileAttachment(
"./cendree_QuotRem_count_1024_256_digits.csv" "./cendree_QuotRem_count_1024_256_digits.csv"
).text().then(asIntegers); ).text().then(asIntegers);
import { expansions as oldExpansions } with { base as base } from "../../../../interactive/p-adics/showAdic.ojs"; import { expansions as oldExpansions } with { base as base } from "/interactive/p-adics/showAdic.ojs";
expansionsOrAdics = baseSelector == "b-adic" expansionsOrAdics = baseSelector == "b-adic"
? oldExpansions ? oldExpansions
@ -32,7 +32,7 @@ import { plot } with {
expansionsOrAdics as expansions, expansionsOrAdics as expansions,
embedBase as embedBase, embedBase as embedBase,
geometric as geometric, geometric as geometric,
} from "../../../../interactive/p-adics/showAdic.ojs"; } from "/interactive/p-adics/showAdic.ojs";
viewof baseSelector = Inputs.radio([ viewof baseSelector = Inputs.radio([
"b-adic", "b-adic",

4
posts/math/stereo/2/index.qmd
View File

@ -60,7 +60,7 @@ In an effort to document more interesting facts about this mathematical object
Chebyshev Polynomials Chebyshev Polynomials
--------------------- ---------------------
[Previously](/posts/chebyshev/1), I derived the [Previously](/posts/math/chebyshev/1), I derived the
[Chebyshev polynomials](https://en.wikipedia.org/wiki/Chebyshev_polynomials) [Chebyshev polynomials](https://en.wikipedia.org/wiki/Chebyshev_polynomials)
with the archetypal complex exponential. with the archetypal complex exponential.
These polynomials express the sines and cosines of a multiple of an angle from These polynomials express the sines and cosines of a multiple of an angle from
@ -99,7 +99,7 @@ Presented this way with such a simple derivation, it appears as though these rel
are inherently trigonometric. are inherently trigonometric.
However, these polynomials actually have *nothing* to do with sine and cosine on their own. However, these polynomials actually have *nothing* to do with sine and cosine on their own.
For one, [they appear in graph theory](/posts/chebyshev/2), and for two, For one, [they appear in graph theory](/posts/math/chebyshev/2), and for two,
the importance of the complex exponential is overstated. the importance of the complex exponential is overstated.
$e^{i\theta}$ really just specifies a point on the complex unit circle. $e^{i\theta}$ really just specifies a point on the complex unit circle.
This property is used on the second line to coax the equation into a quadratic in $e^{i\theta}$. This property is used on the second line to coax the equation into a quadratic in $e^{i\theta}$.