Rational pullbacks of Galois covers

Abstract

The finite subgroups of PGL2(C) are shown to be the only finite groups G with this property: for some integer r0 (depending on G), all Galois covers X→ P1C of group G can be obtained by pulling back those with at most r0 branch points along non-constant rational maps P1C → P1C. For G⊂ PGL2(C), it is in fact enough to pull back one well-chosen cover with at most 3 branch points. A consequence of the converse for inverse Galois theory is that, for G ⊂ PGL2(C), letting the branch point number grow provides truly new Galois realizations F/C(T) of G. Another application is that the ``Beckmann--Black'' property that ``any two Galois covers of P1C with the same group G are always pullbacks of another Galois cover of group G'' only holds if G⊂ PGL2(C).