ID 78
著者
亀高, 惟倫 Department of Mathematics and Computer Sciences, Faculty of Integrated Arts and Sciences, Tokushima University
ノダ, マツタロウ Department of Electronic Engineering Faculty of Engineering, Ehime University
資料タイプ
紀要論文
抄録
In our previous paper [1] we considered the simplest power series solution of the Painleve-I equation which is regular at the origin. This note is a sequel to it. Here we consider another simplest Laurent series solution which is singular at the origin. Important feature of this solution is the location of the singularities. The location of the nearest singularity from the origin is given by the radius S of convergence of this Laurent series. The value of S is calculated numerically by the same method as in [1]. We obtained S = 2.56.... Various theoretical bounds for S are also obtained. The mathematical part of this work was done by Kametaka and the numerical part by Noda.
掲載誌名
Journal of mathematics, Tokushima University
ISSN
00754293
cat書誌ID
AA00701816
20
開始ページ
49
終了ページ
59
並び順
49
発行日
1987-01-31
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