@article{oai:ir.kagoshima-u.ac.jp:00002158,
 author = {村島, 定行 and MURASHIMA, Sadayuki},
 journal = {鹿児島大学工学部研究報告, The research reports of the Faculty of Engineering, Kagoshima University},
 month = {Sep},
 note = {In general, the potential function in cylindrical cordinate is expressed in the three diffrent forms, 
what is called the z, r and φ forms, each of which has its own region of rapid convergence. In this reports, the Neumann functions of Laplacs's equation for the six cases of non-finite reglons are given in those three forms by separation of cordinate. For the cases of finite region, the Neumann function does not exist, then the potential due to one pair of positive and negative sources is expressed in the z, r and φ forms. The several examples for application of those results are also shown.},
 pages = {91--99},
 title = {円筒座標系におけるラプラス方程式のノイマン関数},
 volume = {13},
 year = {1971}
}