2014 Help me understand this report
The Bogomolov multiplier of rigid finite groups
Abstract: The Bogomolov multiplier of a finite group G is defined as the subgroup of the Schur multiplier consisting of the cohomology classes vanishing after restriction to all abelian subgroups of G. This invariant of G plays an important role in birational geometry of quotient spaces V /G. We show that in many cases the vanishing of the Bogomolov multiplier is guaranteed by the rigidity of G in the sense that it has no outer class-preserving automorphisms.
Search citation statements
Paper Sections
Select...
4
1
Citation Types
1
15
0
Year Published
2015
2021
Publication Types
Select...
7
Relationship
1
6
Authors
Journals
Cited by 18 publications
(18 citation statements)
References 33 publications
1
15
0
“…We remark that it is known that Br v,C (C(G)) = 0 if G is an extraspecial p-group of order p 2n+1 for any prime number p and any positive integer n [25] (also see [16]). But we can show that C(G) is rational only when G is such a group of order 243 (see the following proof) or of order p 3 (by Theorem 1.7).…”
Section: The Case φ 5 : G(i) 65 ≤ I ≤ 66mentioning
confidence: 98%
“…We remark that it is known that Br v,C (C(G)) = 0 if G is an extraspecial p-group of order p 2n+1 for any prime number p and any positive integer n [25] (also see [16]). But we can show that C(G) is rational only when G is such a group of order 243 (see the following proof) or of order p 3 (by Theorem 1.7).…”
Section: The Case φ 5 : G(i) 65 ≤ I ≤ 66mentioning
confidence: 98%
“…The Bogomolov multiplier can be seen as an obstruction to Noether's rationality problem. In the last few years, there has been a lot of research on the class of groups with trivial and non-trivial Bogomolov multiplier (see [5,14,16,12,13]). Except for the Chevalley and Steinberg groups, the Schur multiplier of most of the other finite simple groups have order at most 2.…”
Section: Introductionmentioning
confidence: 99%
“…Kang and Kunyavskiȋ [16] raised the question whether the triviality of B 0 (G 1 ) and B 0 (G 2 ) implies the triviality of B 0 (G). With the aid of (1.1) we prove our first main result, stating that if θ : G 1 → G 2 is a group homomorphism such that its restriction θ| K 1 : K 1 → K 2 is an isomorphism, then the triviality of B 0 (G 1 /K 1 ), B 0 (G 1 ) and B 0 (G 2 ) implies the triviality of B 0 (G).…”
Section: Introductionmentioning
confidence: 99%
“…The reader is referred to the paper [16] for a survey of groups with trivial Bogomolov multipliers. Definition 1.1.…”
Section: Introductionmentioning
confidence: 99%
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.
Copyright © 2024 scite LLC. All rights reserved.
Made with 💙 for researchers
