Factoring out Horse Shit theory: Difference between revisions

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== External links ==
== External links ==


* [ Post] Twitter
* [https://twitter.com/GnomonChronicl1/status/1357475251299508226 Post] Twitter
* [https://en.wikipedia.org/wiki/Horseshoe_map Horseshoe map] - In the mathematics of chaos theory, a horseshoe map is any member of a class of chaotic maps of the square into itself. It is a core example in the study of dynamical systems. The map was introduced by Stephen Smale while studying the behavior of the orbits of the van der Pol oscillator. The action of the map is defined geometrically by squishing the square, then stretching the result into a long strip, and finally folding the strip into the shape of a horseshoe.
* [https://en.wikipedia.org/wiki/Horseshoe_map Horseshoe map] - In the mathematics of chaos theory, a horseshoe map is any member of a class of chaotic maps of the square into itself. It is a core example in the study of dynamical systems. The map was introduced by Stephen Smale while studying the behavior of the orbits of the van der Pol oscillator. The action of the map is defined geometrically by squishing the square, then stretching the result into a long strip, and finally folding the strip into the shape of a horseshoe.


[[Category:Fiction (nonfiction)]]
[[Category:Fiction (nonfiction)]]
[[Category:Poems by Karl Jones (nonfiction)]]
[[Category:Poems by Karl Jones (nonfiction)]]

Revision as of 16:45, 4 February 2021

Factoring out Horse Shit theory.

"Factoring out Horse Shit theory" is a poem by Karl Jones.

Factoring out Horse Shit theory

x = Horse Shoe theory - Horse Shit theory + Horseshoe Map theory.

Solve for x.

In the News

Fiction cross-reference

Nonfiction cross-reference

External links

  • Post Twitter
  • Horseshoe map - In the mathematics of chaos theory, a horseshoe map is any member of a class of chaotic maps of the square into itself. It is a core example in the study of dynamical systems. The map was introduced by Stephen Smale while studying the behavior of the orbits of the van der Pol oscillator. The action of the map is defined geometrically by squishing the square, then stretching the result into a long strip, and finally folding the strip into the shape of a horseshoe.