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Graph, Wall, Tome: Difference between revisions
→Ongoing Sub-Projects
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== Ongoing Sub-Projects == | == Ongoing Sub-Projects == | ||
* [[The Road to Reality Study Notes|Annotating the Tome]] - The Tome can be intimidating. This problem can be solved 1.) by creating resources that make it easier to digest its content and 2.) by going through the chapters together. | |||
* [[Annotating the Wall]] - The goal is to provide understandable explanations for all concepts shown on the Wall. | * [[Annotating the Wall]] - The goal is to provide understandable explanations for all concepts shown on the Wall. | ||
* [[Animating the Wall]] - The goal is to make the wall more inviting and the symbols on it less cryptic. | * [[Animating the Wall]] - The goal is to make the wall more inviting and the symbols on it less cryptic. | ||
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* [[Geometry|Geometry Project]] - The aim is to create and collect resources related to Frederic P. Schuller's lecture series titled "Lectures on Geometrical Anatomy of Theoretical Physics" that provides a great introduction to geometrical concepts that are essential for the Graph, Wall, Tome project. | * [[Geometry|Geometry Project]] - The aim is to create and collect resources related to Frederic P. Schuller's lecture series titled "Lectures on Geometrical Anatomy of Theoretical Physics" that provides a great introduction to geometrical concepts that are essential for the Graph, Wall, Tome project. | ||
* [[Holonomy Project]] - The goal is to create visualizations for the effect known as "holonomy", whereby parallel transporting a vector around a loop in a curved space leads to the vector changing upon returning to the start of the loop. How/how much the vector changes orientation/position in space is the holonomy of that loop in that space. This effect reveals deep information about the curvature of the space itself. | * [[Holonomy Project]] - The goal is to create visualizations for the effect known as "holonomy", whereby parallel transporting a vector around a loop in a curved space leads to the vector changing upon returning to the start of the loop. How/how much the vector changes orientation/position in space is the holonomy of that loop in that space. This effect reveals deep information about the curvature of the space itself. | ||
== Eric Weinstein's Prompt == | == Eric Weinstein's Prompt == | ||