| ID | 55 |
| 著者 |
オクヤマ, ヒロシ
Faculty of Education Tokushima University
サクマ, モトヨシ
Faculty of Integrated Arts and Sciences Hiroshima University
|
| 資料タイプ |
紀要論文
|
| 抄録 | In his paper [6], M. Steurich introduced the notion of the semigraded local ring as a generalized concept of a power series ring over a field. Corresponding to the non-homogeneous case, we investigate in this paper, how the properties of Golod homomorphisms, due to G. Levin [3], can be transfered to the semigraded case. And, by making use of it, we obtain some change of ring theorems about Poincare series in our semigraded case. Throughout the paper, all rings are commutative and Noetherian, and the symbol (R, m, k) stands for R is a local ring with maximal ideal m and residue field k.
|
| 掲載誌名 |
Journal of mathematics, Tokushima University
|
| ISSN | 00754293
|
| cat書誌ID | AA00701816
|
| 巻 | 15
|
| 開始ページ | 87
|
| 終了ページ | 95
|
| 並び順 | 87
|
| 発行日 | 1981-11-30
|
| 備考 | 公開日:2010年1月24日で登録したコンテンツは、国立情報学研究所において電子化したものです。
|
| フルテキストファイル | |
| 言語 |
eng
|
