Moduli spaces of fundamental groups of curves in positive characteristic I

Abstract

In this series of papers, we investigate a new anabelian phenomenon of curves over algebraically closed fields of positive characteristic. Let Mg, n be the moduli space of curves of type (g, n) over Fp. We introduce a topological space g, n which can be determined group-theoretically from admissible fundamental groups of pointed stable curves of type (g, n). By introducing a certain equivalence relation fe on the underlying topological space | Mg, n| of Mg, n, we obtain a topological space Mg, n:= | Mg, n|/fe. Moreover, there is a natural continuous map πg,n adm: Mg, n → g, n. Furthermore, we pose a conjecture (=the Homeomorphism Conjecture) which says that πg,n adm is a homeomorphism. The Homeomorphism Conjecture generalizes all the conjectures in the theory of anableian geometry of curves over algebraically closed fields of characteristic p. One of main results of the present series of papers says that the Homeomorphism Conjecture holds when dim( Mg, n)=1 (i.e., (g, n)=(0,4) or (g, n)=(1,1)). In the present paper, we establish two fundamental tools to analyze the geometric behavior of curves from open continuous homomorphisms of admissible fundamental groups, which play central roles in the theory developed in the series of papers. Moreover, we prove that π0,n adm([q]) is a closed point of 0,n when [q] is a closed point of M0, n. In particular, we obtain that the Homeomorphism Conjecture holds when (g, n)=(0, 4).