proof of equivalence of Fermat’s Last Theorem to its analytic form

Consider the Taylor expansion of the cosine function. We have

${\lim }_{s\to \mathrm{\infty }}(A_s)=2-\cos x-\cos y$

and

${\lim }_{s\to \mathrm{\infty }}(B_s)=1-\cos z$.

For $r>x,y$ the sequence $a_r$ is decreasing as the denominator grows faster than the numerator. Hence for $s>x,y$ the sequence $A_s$ is increasing as $A_{s+4}=A_s+a_{s+2}-a_{s+4}$ and $a_{s+2}>a_{s+4}$. So if $A_N>0$ for some $N>x,y$, we have $2-\cos x-\cos y>0$. Conversely if no such $N$ exists then $A_s\le 0$ for $s>x,y$, so its limit, $2-\cos x-\cos y$, is also less than or equal to $0$. However as this expression cannot be negative we would have $2-\cos x-\cos y=0$.

Similarly for $r>z$ the sequence $b_r$ is decreasing, and for $s>z$ the sequence $B_s$ is increasing. So if $B_M>0$ for some $M>z$ we have $1-\cos z>0$. Conversely if no such $M$ exists then $1-\cos z\le 0$. However as this expression cannot be negative we would have $1-\cos z=0$.

Note that $2-\cos x-\cos y=0$ precisely when $x,y\in 2\pi \mathbb{Z}$. Also $1-\cos z=0$ precisely when $z\in 2\pi \mathbb{Z}$.

So the form of the theorem may be read:

If for positive reals $x,y,z$ we have $x^n+y^n=z^n$ for some odd integer $n>2$, then either $x$ or $y$ not in $2\pi \mathbb{Z}$ or $z$ not in $2\pi \mathbb{Z}$.

Clearly this only fails if for positive integers $a,b,c$ and some odd $n>2$, we have

${(2\pi a)}^n+{(2\pi b)}^n={(2\pi c)}^n$.

Dividing through by ${(2\pi )}^n$ we see that $a^n+b^n=c^n$.

Conversely suppose we have non-zero integers satisfying $a^n+b^n=c^n$ for some $n>2$. If $n=4k$ we have ${(a^k)}^4+{(b^k)}^4={(c^k)}^4$, contradicting example of Fermat’s last theorem. Hence if $n$ is even we may replace $a,b,c$ with $a^2,b^2,c^2$ and $n$ with $n/2$, which will be odd and greater than 1 (and hence greater than 2 as it is odd). So without loss of generality we may assume $n$ odd.

Finally replace $a,b,c$ with their absolute values and if reorder to obtain a positive integer solution. This would be a counterexample to the form of the theorem as stated above.