Tensor product of inseparable field extensions

Question

Suppose $K$ is a field and $L, L'$ are finite extensions of $K$. It is known that if $L/K$ (or $L'/K$) is separable, then $L \otimes_K L'$ is a product of finitely many fields. Is there a counterexample if $L/K$ and $L'/K$ are both inseparable?

That is, for what $L,L'$ is $L \otimes_K L'$ not a product of finitely many fields?

Edit: I think I may have figured out a solution. Let $L=L'= \mathbb{F}_p(t), K = \mathbb{F}_p(t^p)$. Then $L \otimes_K L'$ has non-zero nilpotent elements - for example, $t\otimes 1 - 1\otimes t$. However, a product of finitely many fields does not have nilpotent elements. Does this work?

Answer 1

Take for $K$ an imperfect field of characteristic $p\gt 0 $ : this means that some $a\in K$ has no $p$-th root in $K$. An example would be $a=x$ in $K=\mathbb F_p(x)$ .

A $p$-th root $\alpha\in K^\text {alg} , \alpha^p=a$ exists however in an algebraic closure $K^\text {alg} $ of $K$ .
The minimal polynomial of $\alpha$ over $K$ is $T^p-a\in K[T]$ (beware that its irreducibility is not a trivial result), so that $$K[\alpha]=K[T]/(T^p-a).$$

You can then take for your example $L=L'=K[\alpha]$, a finite extension of degree $p$ of $K$, and compute $$L\otimes_KL'=L\otimes_K K[T]/(T^p-a)=L[T]/(T^p-a)=L[T]/(T-\alpha)^p.$$ The last expression shows tha $L\otimes_KL'$ has some non-zero nilpotent elements (for example the class of $T-\alpha$) which prevent it from being isomorphic to a product of fields
(since such a product has zero as its only nilpotent element).

Summing up, $L\otimes_KL'$ is an example of a tensor product of finite field extensions of a field $K$ which is not isomorphic to any product of fields.