What was Fermat’s “Marvelous" Proof? | Infinite Series

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If Fermat had a little more room in his margin, what proof would he have written there?

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Resources:
Contemporary Abstract Algebra by Joseph Gallian
https://www.amazon.com/Contemporary-Abstract-Algebra-Joseph-Gallian/dp/1133599702

Standard Definitions in Ring Theory by Keith Conrad
http://www.math.uconn.edu/~kconrad/blurbs/ringtheory/ringdefs.pdf

Rings and First Examples (online course by Prof. Matthew Salomone)
https://www.youtube.com/watch?v=h4UCMd8dyiM

Fermat's Enigma by Simon Singh
https://www.amazon.com/Fermats-Enigma-Greatest-Mathematical-Problem/dp/0385493622

Who was first to differentiate between prime and irreducible elements? (StackExchange)
https://hsm.stackexchange.com/questions/3754/who-was-first-to-differentiate-between-prime-and-irreducible-elements

Previous Episodes:
What Does It Mean to be a Number?
https://www.youtube.com/watch?v=3gBoP8jZ1Is

What are Numbers Made of?
https://www.youtube.com/watch?v=S4zfmcTC5bM

Gabe's references from the comments:

Blog post about the Peano axioms and construction of natural numbers by Robert Low:
http://robjlow.blogspot.co.uk/2018/01/whats-number-1-naturally.html

Recommended by a viewer for connections to formulation of numbers in computer science:
https://softwarefoundations.cis.upenn.edu/

In 1637, Pierre de Fermat claimed to have the proof to his famous conjecture, but, as the story goes, it was too large to write in the margin of his book. Yet even after Andrew Wiles’s proof more than 300 years later, we’re still left wondering: what proof did Fermat have in mind?

The mystery surrounding Fermat’s last theorem may have to do with the way we understand prime numbers. You all know what prime numbers are. An integer greater than 1 is called prime if it has exactly two factors: 1 and itself. In other words, p is prime if whenever you write p as a product of two integers, then one of those integers turns out to be 1. In fact, this definition works for negative integers, too. We simply incorporate -1. But the prime numbers satisfy another definition that maybe you haven’t thought about: An integer p is prime if, whenever p divides a product of two integers, then p divides at least one of those two integers.

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