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@@ -5,13 +5,14 @@
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- Book IX, Proposition 20: Proof of infinite primes
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#### Fermat's Last Theorem and Langlands Program
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+- Langlands Program is to further connect complex analysis with number theory
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+- Riemann's Hypothesis relates prime numbers to solutions of zeta function
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+
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1. Frey's counter-example is an elliptic curve which assumes positive integer solution to aᵖ + bᵖ = cᵖ for p > 2
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2. Then by the Taniyama-Shimura-Weil Conjecture, this gives rise to a [modular form](https://en.wikipedia.org/wiki/Modular_form)
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3. However, it is seen that it is not in fact, a modular form
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4. Reductio Ad Absurdum
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-- Langlands Program is to further connect complex analysis with number theory
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-- Riemann's Hypothesis relates prime numbers to solutions of zeta function
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#### Reading Backlog
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- [Number Theory meets Computability Theory](https://www.nlp-kyle.com/post/number_computability/)
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