Persistence of Galois property of integral hypersurfaces across other characteristics

In this paper, we investigate hypersurfaces in projective spaces defined over the integers. We demonstrate that if a projection from a point is Galois extension a base field with a certain characteristic, it remains Galois after a base change to a field with another characteristic. Furthermore, for quartic hypersurfaces, we provide necessary and sufficient conditions for the Galois group to be given by a projective linear group, depending on the characteristic of the base field.