2 research outputs found

    Hom-versions of the Combinatorial Grothendieck Conjecture I: Abelianizations and Graphically Full Actions

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    Semi-graphs of anabelioids of PSC-type and their PSC-fundamental groups (i.e., a combinatorial Galois-category-theoretic abstraction of pointed stable curves over algebraically closed fields of characteristic zero and their fundamental groups) are central objects in the study of combinatorial anabelian geometry. In the present series of papers, which consists of two successive works, we investigate combinatorial anabelian geometry of (not necessarily bijective) continuous homomorphisms between PSC-fundamental groups. This contrasts with previous researches, which focused only on continuous isomorphisms. More specifically, our main results of the present series of papers roughly state that, if a continuous homomorphism between PSC-fundamental groups is compatible with certain outer representations, then it satisfies a certain “group-theoretic compatibility property”, i.e., the property that each of the images via the continuous homomorphism of certain VCN-subgroups of the domain are included in certain VCNsubgroups of the codomain. Such results may be considered as Homversions of the combinatorial version of the Grothendieck conjecture established in some previous works. As in the case of previous works (i.e., the Isom-versions), the proof requires different techniques depending on the types of outer representations under consideration. In the present paper, we will treat the case where the outer representations under consideration are assumed to be “l-graphically full”, i.e., to satisfy a certain condition concerning “weights” considered with respect to the “l-adic cyclotomic character”, where l is a certain prime number. In addition, to prepare for this purpose, we include detailed expositions on “reduction techniques”, namely, techniques of reduction to the maximal pro-Σ quotients and to the abelianizations of (various open subgroups of) the PSC-fundamental groups under consideration, where Σ is a certain set of prime numbers. Though the discussions of these “reduction techniques” are all essentially wellknown to experts, we present the results in a highly unified/generalized fashion

    Hom-versions of the Combinatorial Grothendieck Conjecture II: Outer Representations of PIPSC- and NN-type

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    In the present paper, we continue our study, which was initiated in the previous paper of the present series of papers, of combinatorial anabelian geometry of (not necessarily bijective) continuous homomorphisms between PSC-fundamental groups of semi-graphs of anabelioids of PSC-type. In particular, we continue to study certain Hom-versions of the combinatorial versions of the Grothendieck conjecture established in some previous works, i.e., to study certain sufficient conditions of certain group-theoretic compatibility properties described in terms of outer representations. The outer representations we mainly concern in the present paper are of PIPSC-type and of NN-type, both of which are of substantial importance in the study of algebro-geometric anabelian geometry of configuration spaces of hyperbolic curves. We also include, as a preparation for one of the main results, a presentation of a “reduction technique”, namely, a technique of reduction to the “compactified quotients” of (various open subgroups of) the PSC-fundamental groups under consideration, in a similar vein to the previous paper where we included other two “reduction techniques”
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