抄録
Let G be a finite nontrivial group and A(G) the Burnside ring of G. Let F be a set of subgroups of G which is closed under taking subgroups and taking conjugations by elements in G. Then let F denote the category whose objects are elements in F and whose morphisms are triples (H; g;K) such that H, K ∈ F and g ∈ G with gHg-1 ⊂ K. Taking the inverse limit of A(H), where H ∈ F, we obtain the ring A(F) and the restriction homomorphism resF G: A(G) → A(F). We study this restriction homomorphism.
| 本文言語 | English |
|---|---|
| ページ(範囲) | 427-444 |
| ページ数 | 18 |
| ジャーナル | Hokkaido Mathematical Journal |
| 巻 | 47 |
| 号 | 2 |
| 出版ステータス | Published - 1月 1 2018 |
ASJC Scopus subject areas
- 数学 (全般)