Anabelian Intersection Theory I: The Conjecture of Bogomolov-Pop and Applications

Abstract

We finish the proof of the conjecture of F. Bogomolov and F. Pop: Let F1 and F2 be fields finitely-generated and of transcendence degree ≥ 2 over k1 and k2, respectively, where k1 is either Q or Fp, and k2 is algebraically closed. We denote by GF1 and GF2 their respective absolute Galois groups. Then the canonical map F1, F2: i(F1, F2)→ (GF2, GF1) from the isomorphisms, up to Frobenius twists, of the inseparable closures of F1 and F2 to continuous outer isomorphisms of their Galois groups is a bijection. Thus, function fields of varieties of dimension ≥ 2 over algebraic closures of prime fields are anabelian. We apply this to give a necessary and sufficient condition for an element of the Grothendieck-Teichm\"uller group to be an element of the absolute Galois group of Q.