Abstract
AbstractIn this paper, we study anabelian geometry of curves over algebraically closed fields of positive characteristic. Let be a pointed stable curve over an algebraically closed field of characteristic and the admissible fundamental group of . We prove that there exists a group‐theoretical algorithm, whose input datum is the admissible fundamental group , and whose output data are the topological and the combinatorial structures associated with . This result can be regarded as a mono‐anabelian version of the combinatorial Grothendieck conjecture in the positive characteristic. Moreover, by applying this result, we construct clutching maps for moduli spaces of admissible fundamental groups.
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