research article
Bifurcation Problems for Generalized Beam Equations
Abstract
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 analysisSimilar works
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Last time updated on 13/10/2017
This paper was published in Directory of Open Access Journals.
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