Bifurcation Problems for Generalized Beam Equations
Author
Source
Advances in Mathematical Physics
Issue
Vol. 2014, Issue 2014 (31 Dec. 2014), pp.1-6, 6 p.
Publisher
Hindawi Publishing Corporation
Publication Date
2014-12-22
Country of Publication
Egypt
No. of Pages
6
Main Subjects
Abstract EN
We investigate a class of bifurcation problems for generalized beam equations and prove that the one-parameter family of problems have exactly two bifurcation points via a unified, elementary approach.
The proof of the main results relies heavily on calculus facts rather than such complicated arguments as Lyapunov-Schmidt reduction technique or Morse index theory from nonlinear functional analysis.
American Psychological Association (APA)
Wang, Fosheng. 2014. Bifurcation Problems for Generalized Beam Equations. Advances in Mathematical Physics،Vol. 2014, no. 2014, pp.1-6.
https://search.emarefa.net/detail/BIM-1015565
Modern Language Association (MLA)
Wang, Fosheng. Bifurcation Problems for Generalized Beam Equations. Advances in Mathematical Physics No. 2014 (2014), pp.1-6.
https://search.emarefa.net/detail/BIM-1015565
American Medical Association (AMA)
Wang, Fosheng. Bifurcation Problems for Generalized Beam Equations. Advances in Mathematical Physics. 2014. Vol. 2014, no. 2014, pp.1-6.
https://search.emarefa.net/detail/BIM-1015565
Data Type
Journal Articles
Language
English
Notes
Includes bibliographical references
Record ID
BIM-1015565
