Difference between revisions of "Category Theory"

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It slide set can be found [https://tsmithe.net/papers/20210512-fra-slides.pdf here].
The video's slide set<ref>https://tsmithe.net/papers/20210512-fra-slides.pdf</ref> is available.


==William Lawvere==
==William Lawvere==

Revision as of 18:56, 1 July 2021

Category Theory is a foundational representation of mathematics. It directly relates to how data and computation can be represented as functions or relations. Due to its generally applicable nature, it is so general that many mathematicians calls it Abstract nonsense.

The seminal paper, A General Theory of Natural Equivalence[1] that defined the outline of Category Theory was written by Saunders MacLane and Samuel Eilenberg.

Category Theory Online Tutorials

For starters, the following video series would be great starting points for people who wants to know more about Category Theory.

Richard Southwell

Richard Southwell has a youtube channel on many subjects about math, particularly having a long series on Category Theory.

Topos Institute

Topos Institute, founded by David Spivak and Brendan Fong, also has a youtube channel on Category Theory.

Topos institute publishes its lectures on Youtube, for example:

Compositional Active Inference: A “Process Theory” for Finding Right Abstractions

A talk by: Toby St Clere Smithe.

{{#ev:youtube|CoVKGFH6wRQ|||||}}

The video's slide set[2] is available.

William Lawvere

{{#ev:youtube|https://www.youtube.com/watch?v=ZYGyEPXu8as%7C%7C%7C%7C%7C}}

References

  1. Samuel Eilenberg, Saunders MacLane, General Theory of Natural Equivalences, Transactions of the American Mathematical Society Vol. 58, No. 2 (Sep., 1945), pp. 231-294, American Mathematical Society, https://www.jstor.org/stable/1990284?seq=1
  2. https://tsmithe.net/papers/20210512-fra-slides.pdf