Difference between revisions of "Rulers and Protractors Become General Relativity"

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Eric believes [[General Relativity]] can be explained in a way most people can understand, and this explanation he [[Riffs to Animate|wishes to have animated]]
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Eric believes General Relativity can be explained in a way most people can understand, and this explanation he [[Riffs to Animate|wishes to have animated]]


== Eric's Explanation from Discord ==
== Eric's Explanation from Discord ==
<blockquote>
<blockquote>
Rulers and Protractors --> Dervivative
Rulers and Protractors --> Derivative


Derivative --> Rise over run where run is measured above an implied horizontal
Derivative --> Rise over run where run is measured above an implied horizontal


Horlizontals form 'Penrose Steps" -->  Degree of Penroseness is measured by the Riemmann Curvature Tensor.
Horizontals form "Penrose Steps" -->  Degree of Penroseness is measured by the Riemmann Curvature Tensor.


Curvature Tensor breaks into 6 Pieces, 3 of which are zero. --> Throw away non-zero Weyl Component and rebalance the other two non-zero components.
Curvature Tensor breaks into 6 Pieces, 3 of which are zero. --> Throw away non-zero Weyl Component and rebalance the other two non-zero components.
Line 13: Line 15:
Set rebalanced remaining two components equal to the matter and energy in the system.
Set rebalanced remaining two components equal to the matter and energy in the system.
</blockquote>
</blockquote>
==  Breakdown of the description for discussion purposes ==
<blockquote>
0.5  ...when I have to describe what General Relativity is, and I don't wish to lie the way everyone else lies (if I'm going lie I'm going to do it differently) I say that:
1. You have to begin with 4 degrees of freedom
2. And then you have to put rulers and protractors into that system so that you can measure length and angle.
3. That gives rise miraculously to a derivative operator that measures rise over run
4. That rise is measured from a reference level
5. Those reference levels don't knit together
6.  And they form Penrose stairs
7.  And the degree of Escherness, or Penroseness, is what is measured by the curvature tensor
8.  which breaks into three pieces
9.  you throw one of them away, called the Weyl curvature
10.  you readjust the proportions of the other two
11.  and you set that equal to the amount of stuff.
12.  It is linguistically an accurate description of what General Relativity actually is.
13. It also illustrates cohomology
</blockquote>


== Links ==
== Links ==
* See [[20: Sir Roger Penrose - Plotting the Twist of Einstein’s Legacy|The Portal Episode 20]] at 39:00 where Eric explains this: https://youtu.be/mg93Dm-vYc8?t=2340
* Eric explaining this on Episode 20
{{#widget:YouTube|id=mg93Dm-vYc8|start=2329}}


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[[Category:Graph, Wall, Tome]]
[[Category:Riffs to Animate]]
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Latest revision as of 22:29, 9 April 2021

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Eric believes General Relativity can be explained in a way most people can understand, and this explanation he wishes to have animated

Eric's Explanation from Discord

Rulers and Protractors --> Derivative

Derivative --> Rise over run where run is measured above an implied horizontal

Horizontals form "Penrose Steps" --> Degree of Penroseness is measured by the Riemmann Curvature Tensor.

Curvature Tensor breaks into 6 Pieces, 3 of which are zero. --> Throw away non-zero Weyl Component and rebalance the other two non-zero components.

Set rebalanced remaining two components equal to the matter and energy in the system.

Breakdown of the description for discussion purposes

0.5 ...when I have to describe what General Relativity is, and I don't wish to lie the way everyone else lies (if I'm going lie I'm going to do it differently) I say that:

1. You have to begin with 4 degrees of freedom

2. And then you have to put rulers and protractors into that system so that you can measure length and angle.

3. That gives rise miraculously to a derivative operator that measures rise over run

4. That rise is measured from a reference level

5. Those reference levels don't knit together

6. And they form Penrose stairs

7. And the degree of Escherness, or Penroseness, is what is measured by the curvature tensor

8. which breaks into three pieces

9. you throw one of them away, called the Weyl curvature

10. you readjust the proportions of the other two

11. and you set that equal to the amount of stuff.

12. It is linguistically an accurate description of what General Relativity actually is.

13. It also illustrates cohomology


Links

  • Eric explaining this on Episode 20