{"title":"数值不变量的群论性与组态空间群的可分辨子群","authors":"Yuichiro Hoshi, Arata Minamide, S. Mochizuki","doi":"10.2996/kmj45301","DOIUrl":null,"url":null,"abstract":"Let Σ be a set of prime numbers which is either of cardinality one or equal to the set of all prime numbers. In this paper, we prove that various objects that arise from the geometry of the configuration space of a hyperbolic curve over an algebraically closed field of characteristic zero may be reconstructed group-theoretically from the pro-Σ fundamental group of the configuration space. Let X be a hyperbolic curve of type (g, r) over a field k of characteristic zero. Thus, X is obtained by removing from a proper smooth curve of genus g over k a closed subscheme [i.e., the “divisor of cusps”] of X whose structure morphism to Spec(k) is finite étale of degree r; 2g−2+r > 0. Write Xn for the n-th configuration space associated to X, i.e., the complement of the various diagonal divisors in the fiber product over k of n copies of X. Then, when k is algebraically closed, we show that the triple (n, g, r) and the generalized fiber subgroups — i.e., the subgroups that arise from the various natural morphisms Xn → Xm [m < n], which we refer to as generalized projection morphisms — of the pro-Σ fundamental group Πn of Xn may be reconstructed group-theoretically from Πn whenever n ≥ 2. This result generalizes results obtained previously by the first and third authors and A. Tamagawa to the case of arbitrary hyperbolic curves [i.e., without restrictions on (g, r)]. As an application, in the case where (g, r) = (0, 3) and n ≥ 2, we conclude that there exists a direct product decomposition Out(Πn) = GT Σ ×Sn+3 — where we write “Out(−)” for the group of outer automorphisms [i.e., without any auxiliary restrictions!] of the profinite group in parentheses and GT (respectively, Sn+3) for the pro-Σ Grothendieck-Teichmüller group (respectively, symmetric group on n+3 letters). This direct product decomposition may be applied to obtain a simplified purely grouptheoretic equivalent definition — i.e., as the centralizer in Out(Πn) of the union of the centers of the open subgroups of Out(Πn) — of GT . One of the key notions underlying the theory of the present paper is the notion of a pro-Σ log-full subgroup — which may be regarded as a sort of higher-dimensional analogue of the notion of a pro-Σ cuspidal inertia subgroup of a surface group — of Πn. In the final section of the present paper, we show that, when X and k satisfy certain conditions concerning “weights”, the pro-l log-full subgroups may be reconstructed group-theoretically from the natural outer action of the absolute Galois group of k on the geometric pro-l fundamental group of Xn. 2010 Mathematics Subject Classification. Primary 14H30; Secondary 14H10.","PeriodicalId":54747,"journal":{"name":"Kodai Mathematical Journal","volume":null,"pages":null},"PeriodicalIF":0.4000,"publicationDate":"2022-11-30","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"11","resultStr":"{\"title\":\"Group-theoreticity of numerical invariants and distinguished subgroups of configuration space groups\",\"authors\":\"Yuichiro Hoshi, Arata Minamide, S. Mochizuki\",\"doi\":\"10.2996/kmj45301\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"Let Σ be a set of prime numbers which is either of cardinality one or equal to the set of all prime numbers. In this paper, we prove that various objects that arise from the geometry of the configuration space of a hyperbolic curve over an algebraically closed field of characteristic zero may be reconstructed group-theoretically from the pro-Σ fundamental group of the configuration space. Let X be a hyperbolic curve of type (g, r) over a field k of characteristic zero. Thus, X is obtained by removing from a proper smooth curve of genus g over k a closed subscheme [i.e., the “divisor of cusps”] of X whose structure morphism to Spec(k) is finite étale of degree r; 2g−2+r > 0. Write Xn for the n-th configuration space associated to X, i.e., the complement of the various diagonal divisors in the fiber product over k of n copies of X. Then, when k is algebraically closed, we show that the triple (n, g, r) and the generalized fiber subgroups — i.e., the subgroups that arise from the various natural morphisms Xn → Xm [m < n], which we refer to as generalized projection morphisms — of the pro-Σ fundamental group Πn of Xn may be reconstructed group-theoretically from Πn whenever n ≥ 2. This result generalizes results obtained previously by the first and third authors and A. Tamagawa to the case of arbitrary hyperbolic curves [i.e., without restrictions on (g, r)]. As an application, in the case where (g, r) = (0, 3) and n ≥ 2, we conclude that there exists a direct product decomposition Out(Πn) = GT Σ ×Sn+3 — where we write “Out(−)” for the group of outer automorphisms [i.e., without any auxiliary restrictions!] of the profinite group in parentheses and GT (respectively, Sn+3) for the pro-Σ Grothendieck-Teichmüller group (respectively, symmetric group on n+3 letters). This direct product decomposition may be applied to obtain a simplified purely grouptheoretic equivalent definition — i.e., as the centralizer in Out(Πn) of the union of the centers of the open subgroups of Out(Πn) — of GT . One of the key notions underlying the theory of the present paper is the notion of a pro-Σ log-full subgroup — which may be regarded as a sort of higher-dimensional analogue of the notion of a pro-Σ cuspidal inertia subgroup of a surface group — of Πn. In the final section of the present paper, we show that, when X and k satisfy certain conditions concerning “weights”, the pro-l log-full subgroups may be reconstructed group-theoretically from the natural outer action of the absolute Galois group of k on the geometric pro-l fundamental group of Xn. 2010 Mathematics Subject Classification. 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Group-theoreticity of numerical invariants and distinguished subgroups of configuration space groups
Let Σ be a set of prime numbers which is either of cardinality one or equal to the set of all prime numbers. In this paper, we prove that various objects that arise from the geometry of the configuration space of a hyperbolic curve over an algebraically closed field of characteristic zero may be reconstructed group-theoretically from the pro-Σ fundamental group of the configuration space. Let X be a hyperbolic curve of type (g, r) over a field k of characteristic zero. Thus, X is obtained by removing from a proper smooth curve of genus g over k a closed subscheme [i.e., the “divisor of cusps”] of X whose structure morphism to Spec(k) is finite étale of degree r; 2g−2+r > 0. Write Xn for the n-th configuration space associated to X, i.e., the complement of the various diagonal divisors in the fiber product over k of n copies of X. Then, when k is algebraically closed, we show that the triple (n, g, r) and the generalized fiber subgroups — i.e., the subgroups that arise from the various natural morphisms Xn → Xm [m < n], which we refer to as generalized projection morphisms — of the pro-Σ fundamental group Πn of Xn may be reconstructed group-theoretically from Πn whenever n ≥ 2. This result generalizes results obtained previously by the first and third authors and A. Tamagawa to the case of arbitrary hyperbolic curves [i.e., without restrictions on (g, r)]. As an application, in the case where (g, r) = (0, 3) and n ≥ 2, we conclude that there exists a direct product decomposition Out(Πn) = GT Σ ×Sn+3 — where we write “Out(−)” for the group of outer automorphisms [i.e., without any auxiliary restrictions!] of the profinite group in parentheses and GT (respectively, Sn+3) for the pro-Σ Grothendieck-Teichmüller group (respectively, symmetric group on n+3 letters). This direct product decomposition may be applied to obtain a simplified purely grouptheoretic equivalent definition — i.e., as the centralizer in Out(Πn) of the union of the centers of the open subgroups of Out(Πn) — of GT . One of the key notions underlying the theory of the present paper is the notion of a pro-Σ log-full subgroup — which may be regarded as a sort of higher-dimensional analogue of the notion of a pro-Σ cuspidal inertia subgroup of a surface group — of Πn. In the final section of the present paper, we show that, when X and k satisfy certain conditions concerning “weights”, the pro-l log-full subgroups may be reconstructed group-theoretically from the natural outer action of the absolute Galois group of k on the geometric pro-l fundamental group of Xn. 2010 Mathematics Subject Classification. Primary 14H30; Secondary 14H10.
期刊介绍:
Kodai Mathematical Journal is edited by the Department of Mathematics, Tokyo Institute of Technology. The journal was issued from 1949 until 1977 as Kodai Mathematical Seminar Reports, and was renewed in 1978 under the present name. The journal is published three times yearly and includes original papers in mathematics.