@article{oai:iwate-u.repo.nii.ac.jp:00009724,
 author = {菅野, 良弘 and 佐藤, 恵一 and 木村, 範貴 and 須見, 尚文},
 issue = {595},
 journal = {日本機械学會論文集. A編},
 month = {Jan},
 note = {This paper is concerned with an approximate three-dimensional analysis of thermal stresses in a nonhomogeneous plate with temperature variation and nonhomogeneous properties only in the thickness direction. The nonhomogeneous plate is approximated as a laminated plate consisting of different homogeneous and isotropic layers which are perfectly bonded to each neighboring layer. The transient temperature field is analyzed by Vodicka's method for a heat conduction problem in one-dimensional composite regions. The nonhomogeneous thermal and elastic properties are restricted to those symmetric with respect to the mid-plane of the plate. The three-dimensional thermal stresses are analyzed using the solutions developed by Rogers and Spencer, which are expressed in terms of the solution of the approximate, two-dimensional, thin-plate, governing equations for an equivalent homogeneous plate.},
 pages = {728--736},
 title = {不均質平板の非定常熱応力の三次元解析},
 volume = {62},
 year = {1996}
}