On modular forms of weight (6n + l)/5 satisfying a certain differential equation

研究成果: 著書/レポートタイプへの貢献

12 引用 (Scopus)

抄録

We study solutions of a differential equation which arose in our previous study of supersingular elliptic curves. By choosing one fifth of an integer k as the parameter involved in the differential equation, we obtain modular forms of weight k as solutions. It is observed that this solution is also related to supersingular elliptic curves.

元の言語英語
ホスト出版物のタイトルNUMBER THEORY
編集者WENPENG ZHANG, YOSHIO TANIGAWA
ページ97-102
ページ数6
出版物ステータス出版済み - 12 1 2006

出版物シリーズ

名前Developments in Mathematics
15
ISSN(印刷物)1389-2177

Fingerprint

Modular Forms
Elliptic Curves
Differential equation
Integer

All Science Journal Classification (ASJC) codes

  • Mathematics(all)

これを引用

Kaneko, M. (2006). On modular forms of weight (6n + l)/5 satisfying a certain differential equation. : WENPENG. ZHANG, & YOSHIO. TANIGAWA (版), NUMBER THEORY (pp. 97-102). (Developments in Mathematics; 巻数 15).

On modular forms of weight (6n + l)/5 satisfying a certain differential equation. / Kaneko, Masanobu.

NUMBER THEORY. 版 / WENPENG ZHANG; YOSHIO TANIGAWA. 2006. p. 97-102 (Developments in Mathematics; 巻 15).

研究成果: 著書/レポートタイプへの貢献

Kaneko, M 2006, On modular forms of weight (6n + l)/5 satisfying a certain differential equation. : WENPENG ZHANG & YOSHIO TANIGAWA (版), NUMBER THEORY. Developments in Mathematics, 巻. 15, pp. 97-102.
Kaneko M. On modular forms of weight (6n + l)/5 satisfying a certain differential equation. : ZHANG WENPENG, TANIGAWA YOSHIO, 編集者, NUMBER THEORY. 2006. p. 97-102. (Developments in Mathematics).
Kaneko, Masanobu. / On modular forms of weight (6n + l)/5 satisfying a certain differential equation. NUMBER THEORY. 編集者 / WENPENG ZHANG ; YOSHIO TANIGAWA. 2006. pp. 97-102 (Developments in Mathematics).
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