Self-Similarity: Difference between revisions
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Self-reference means that [[recursive]] [[algorithms]] can be used to simplify the process of creating [[Complexity|complex]] patterns. Self-similarity is what you get when you use self-reference and [[recursion]] to create a [[fractal]] shape. | Self-reference means that [[recursive]] [[algorithms]] can be used to simplify the process of creating [[Complexity|complex]] patterns. Self-similarity is what you get when you use self-reference and [[recursion]] to create a [[fractal]] shape. | ||
Without self-similarity and [[recursion]], the coding required to define the [[Tree of knowledge|structure of a tree]] or that of our [[Neural network|nervous]] and circulatory systems would be incredibly complex and it becomes impossible to conceive of how these could evolve via [[random]] processes. But with it, they boil down to simple branching instructions repeated a few times in a [[feedback]] loop. | Without self-similarity and [[recursion]], the coding required to define the [[Tree of knowledge|structure of a tree]], most of [[nature]], or that of our [[Neural network|nervous]] and circulatory systems would be incredibly complex and it becomes impossible to conceive of how these could evolve via [[random]] processes. But with it, they boil down to simple branching instructions repeated a few times in a [[feedback]] loop. | ||
The [[macroscopic]] is a manifestation of the microscopic and the same patterns appear at every level of scale. As the saying goes it's "[https://en.wikipedia.org/wiki/Turtles_all_the_way_down turtles all the way down]". | The [[macroscopic]] is a manifestation of the microscopic and the same patterns appear at every level of scale. As the saying goes it's "[https://en.wikipedia.org/wiki/Turtles_all_the_way_down turtles all the way down]". | ||
Revision as of 11:53, 21 December 2024
Self-similarity and self-reference are key traits of the fractal and therefore the universe.
Here is an example of self-reference.
Self-reference means that recursive algorithms can be used to simplify the process of creating complex patterns. Self-similarity is what you get when you use self-reference and recursion to create a fractal shape.
Without self-similarity and recursion, the coding required to define the structure of a tree, most of nature, or that of our nervous and circulatory systems would be incredibly complex and it becomes impossible to conceive of how these could evolve via random processes. But with it, they boil down to simple branching instructions repeated a few times in a feedback loop.
The macroscopic is a manifestation of the microscopic and the same patterns appear at every level of scale. As the saying goes it's "turtles all the way down".
See Gödel to go down the rabbit hole.