Say $r$ is a Galois radius of an integer $n$ if $\omega(n-r)=\omega(n+r)=1$, where $\omega$ counts the prime factors regardless of multiplicity, and say $s$ is a $k$-quasi-Galois radius of $n$ if $\omega(\vert n-s\vert)\leq k$ and $\omega(n+s)\leq k$. Is the product of $k$ pairwise distinct Galoi...