AnnalsofMathematics,141 (1995),443-551 Pierre de Fermat Andrew John Wiles Modular elliptic curves and Fermat’s Last Theorem By AndrewJohnWiles* ForNada,Claire.
I know that professor Andrew Wiles discovered his proof of Fermat's Last Theorem in 1995. One of my friends is looking for a text which provides his proof.
I know that the proof is very complicated and uses difficult methods to get the solution, but I hope that you can give me the name of a text which contains it (or a link to the proof or such a text:)) I would also like to know what prerequisites are needed to study/understand the proof in detail? Furthermore, has anyone else discovered another proof since Wiles, or is Andrew Wiles' proof the only known solution? Foundation Design Wayne C Teng Pdf Download. There are very few professional mathematicians who have read and understood all of Wiles proof. The pre-requisites go a long way beyond college level mathematics. Looking at Wiles paper is not a good way to learn about this problem. If you're interested in number theory, you could begin by studying Hardy and Wright: 'An introduction to theory of numbers'.
Some special cases of Fermat's last theorem were solved in the nineteenth century, and you should see their proofs in an introduction to algebraic number theory. The very minimal prerequisites for understanding the proof of Fermat's Last Theorem would include knowledge of algebraic number theory, modular forms, elliptic curves, Galois theory, Galois cohomology, and representation theory. A considerable amount of higher mathematics is needed to understand these areas in detail, including a very strong background in (advanced) abstract algebra. If/once you are comfortable with the necessary background material and are still interested in what I hear is a very good reference on the proof and its methods, check out by Silverman, Stevens, and Cornell. The text is at intended for professional mathematicians, so it certainly won't be an easy read, but if one has a strong enough background and enough tenacity, one could certainly make it through.