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I have a question about the following paragraph from Dummit and Foote on separable polynomials:

We now investigate further the structure of inseparable irreducible polynomials over fields of characteristic $p$. We have seen above that if $p(x)$ is an irreducible polynomial which is not separable, then its derivative $D_x p(x)$ is identically $0$, so that $p(x) = p_1(x^p)$ for some polynomial $p_1(x)$. The polynomial $p_1(x)$ may or may not itself be separable. If not, then it too is a polynomial in $x^{p}$: $p_1(x) = p_2(x^p)$, so that $p(x)$ is a polynomial in $x^{p^2}$: $p(x) = p_2(x^p)$. Continuing in this fashion we see that there is a uniquely defined power $p^k$ of $p$ such that $p(x) = p_k(x^{p^k})$ where $p_k(x)$ has nonzero derivative. It is clear that $p_k(x)$ is irreducible since any factorization of $p_k(x)$ would, after replacing $x$ by $x^{p^k}$, immediately imply a factorization of the irreducible $p(x)$. It follows that $p_k(x)$ is separable. We summarize this as:

Proposition 38. Let $p(x)$ be an irreducible polynomial over a field $F$ of characteristic $p$. Then there is a unique integer $k > 0$ and a unique irreducible separable polynomial $p_{sep}(x) \in F[x]$ such that $p(x) = p_{sep}(x^{p^k}).$

I don't understand why this process stops with a separable polynomial (and why does it stop, can't we get stuck with the same polynomial in some sort of an infinite loop ?)

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    @MartinSleziak - Thanks. Since this picture is uploaded into the Math.SE server it should be self-contained , doesn't it ?2012-05-04

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Let $F$ be a field, and let $p(x)$ be an irreducible polynomial over $F$ (in particular, $\deg(p)\gt 0$). Then $p(x)$ is separable if and only if $p'(x)\neq 0$. Indeed, $p(x)$ has multiple roots if and only if $\gcd(p,p')\neq 1$. If $p'(x)\neq 0$, then no associate of $p(x)$ can divide $p'$, since $\deg(p')\lt \deg p$. Since the only factors of $p(x)$ are units and associates of $p(x)$, it follows that if $p'(x)\neq 0$ then $\gcd(p,p')$ is a unit, hence of degree $0$. On the other hand, if $p'=0$, then $p(x)$ must be a polynomial in $x^p$ with $\mathrm{char}(F)=p$, that is: $p(x) = a_0 + a_1x^p + \cdots + a_nx^{p^n}$ because if $p(x) = c_0 + c_1x + \cdots +c_rx^r$, then the $i$th coefficient of $p'(x)$i s $ic_i$, hence we must have that $p|i$ whenever $c_i\neq 0$.

Therefore, in an algebraic closure of $F$ we have $p(x) = (b_0 + b_1x + \cdots + b_nx^{p^{n-1}})^p$ where $b_i^p = a_i$, so $p(x)$ has repeated roots hence is not separable.

Hence, if $\mathrm{char}(F)=p\gt 0$, then an irreducible polynomial $p(x)$ over $F$ is not separable if and only if $p(x) = p_1(x^p)$ for some irreducible polynomial $p_1(x)$.

Let $p(x)$ be an irreducible polynomial over a field of characteristic $p$. If $p(x)$ is a polynomial in $x^p$, $p(x) = p_1(x^p)$, then note that the degree of $p_1$ is $\frac{1}{p}\deg(p)$. If $p_1(x)$ is not a polynomial in $x^p$ then it is separable and we are done. If $p_1(x)$ is a polynomial in $x^p$, then by inducting on the degree we obtain that $p_1(x)$ can be written as a polynomial $p_{\rm sep}(x^{p^k})$ for some separable $p_{\rm sep}(x)$ and some $k$, hence $p(x) = p_{\rm sep}(x^{p^{k+1}})$, as desired.