The Proof of Fermat's Last Theorem

i) Instead of x~-l-y'=z "" we use (x -b)"-t-x" = (x-H-a)" (O. 1 ) as the general equation of Fermat's Last Theorem (FLT), where a and b are two arbitrary natural numbers. B)' means of binomial expansion, (0\_1) can be written as n ~.\_ ~ (~)~,-~[a,\_(2b),]=o (0.2) r= 1 Because a"--(-b ) ~ alwa)'s co

This book will describe the recent proof of Fermat's Last Theorem by Andrew Wiles, aided by Richard Taylor, for graduate students and faculty with a reasonably broad background in algebra. It is hard to give precise prerequisites but a first course in graduate algebra, covering basic groups, rings,

The proof of the conjecture mentioned in the title was finally completed in September of 1994. A. Wiles announced this result in the summer of 1993; however, there was a gap in his work. The paper of Taylor and Wiles does not close this gap but circumvents it. This article is an adaptation of severa