@techreport{oai:jaxa.repo.nii.ac.jp:00044831,
 author = {遠藤, 修司 and ENDO, Shuji},
 month = {Jun},
 note = {A system of two-dimensional heat conduction equations for thin elastic circular cylindrical shells is derived as a first approximation, consistent to Kirchhoff-Love's hypothesis. Both the heat conduction equations and the mechanical equations of the shells are deduced from three-dimensional equations of thermo-elasticity, by way of the Legendre polynomials expansion. It is shown that the temperature, as well as the stress distributions through the shell thickness, can be assumed linear, as a consistent approximation under Kirchhoff-Love's hypothesis. The accuracies of the solutions of the classical linear shell theories are compared for thermo-elastic boundary value problems of edgewise-loaded, circular cylindrical shells. It will be shown that the solutions are obtained accurately within the errors inherent to the Kirchhoff-Love hypothesis for any of those well-known classical theories including the Flugge, the Koiter-Sanders, the Novozhilov, and the Love-Reissner theories. The resulting heat conduction equations are found to be identical to those developed by Bolotin., 資料番号: NALTR0577000, レポート番号: NAL TR-577},
 title = {円筒シェルの熱変形基礎式について},
 year = {1979}
}