@article{oai:nagasaki-u.repo.nii.ac.jp:00014317,
 author = {松田, 浩 and 崎山, 毅 and 森田, 千尋},
 issue = {33},
 journal = {長崎大学工学部研究報告, Reports of the Faculty of Engineering, Nagasaki University},
 month = {Aug},
 note = {An approximate method for the numerical analysis of rectangular plates based on Mindlin's theory is presented. Any two opposite edges are assumed to be simply supported in the present analysis, and a variety of boundary conditions can be specified along either of the remaining two opposite edges. In order to confirm the convergence and accuracy of numerical solutions, the square plates with various boundary conditions are calculated, and the results are compared with discrete solutions previously obtained by the authors and analytical solutions. As the applications of the proposed method, variable thickness rectangular plates with two boundary conditions are calculated., 長崎大学工学部研究報告, 19(33), pp.35-42; 1989},
 pages = {35--42},
 title = {変厚矩形板の曲げの一簡易解析法},
 volume = {19},
 year = {1989}
}