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Application of Finite Element Method to the Nonconservative Problems of Elastic Stability of Thin Walled Members with Open Cross-section

Memoirs of the Faculty of Engineering, Yamaguchi University Volume 29 Issue 2 Page 223-231
published_at 1979
KJ00000156249.pdf
[fulltext] 648 KB
Title
薄肉開断面部材の非保存的弾性安定問題への有限要素法の応用
Application of Finite Element Method to the Nonconservative Problems of Elastic Stability of Thin Walled Members with Open Cross-section
Creators Aida Tadayoshi
Creators Iwasa Shingo
Creators Saga Takanori
Source Identifiers
The differetial equations and the corresponding mechanical boundary conditions governing the dynamic instability due to the distributed follower forces are obtained from the principle of virtual work. The finite element method is applied to stability analysis of structural systems subjected to the uniformly distributed and concentrated follower forces. In obtaining the above equations and applying the finite element method, the initial torsional moment M^O_Z is regarded as the nonconservative moment. Initial stress matrices K_<Np> and K_<Nq> due to nonconservative component of follower force are derived.
Subjects
土木工学 ( Other)
Languages jpn
Resource Type departmental bulletin paper
Publishers 山口大学工学部
Date Issued 1979
File Version Version of Record
Access Rights open access
Relations
[ISSN]0372-7661
[NCID]AN00244228
Schools 工学部