@article{oai:sucra.repo.nii.ac.jp:00012618,
 author = {土田, 栄一郎 and 荒居, 善雄 and 堀辺, 忠志 and 草野, 宣幸},
 issue = {719},
 journal = {日本機械学會論文集. A編},
 month = {},
 note = {This paper presents an analytical solution for an infinite strip having a circular inclusion when the strip is subjected to tension at infinity. In the analysis, the inclusion is assumed to be perfectly bonded and be allowed to slide. The analysis is based on the Papcovich Neuber stress function approach and the solution is obtained by the proper combination of harmonic function in integral forms and infinite series. The boundary conditions at the interface uniting the strip and the inclusion are satisfied using the relations between the polar and Cartesian harmonics. The numerical results obtained from the proposed method are illustrated for various stiffness ratio and sizes of the inclusion., text, application/pdf},
 pages = {990--997},
 title = {円形介在物を有する帯板の引張り},
 volume = {72},
 year = {2006},
 yomi = {ツチダ, エイイチロウ and アライ, ヨシオ and ホリベ, タダシ and クサノ, ノブユキ}
}