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Let $L$ be a Galois extension of a countable Hilbertian field $K$. Although $L$ need not be Hilbertian, we prove that an abundance of large Galois subextensions of $L/K$ are.

A variety $X$ over a field $K$ is of Hilbert type if $X\left(K\right)$ is not thin. We prove that if $f:X\to S$ is a dominant morphism of $K$-varieties and both $S$ and all fibers $f^{-1}\left(s\right)$, $s\in S\left(K\right)$, are of Hilbert type, then so is $X$. We apply this to answer a question of Serre on products of varieties and to generalize a result of Colliot-Thélène and Sansuc on algebraic groups.