Bifurcation Problem for Eigenvalues of a Nonlocal Differential Equation
スポンサーリンク
概要
- 論文の詳細を見る
Bifurcation problem for the eigenvalues of a second order differential equation with nonlocal term is considered. The problem is from a linearized stability problem for the kinematic equation with global feedback [1]. By differentiating the equation a third order equation is derived, and then the bifurcation curves of eigenvalues are investigated.
- 宇部工業高等専門学校の論文
著者
関連論文
- Global Well-Posedness and Exponential Attractor for the Oregonator System with Global Feedback
- Bifurcation Problem for Eigenvalues of a Nonlocal Differential Equation
- Stability of the Constant Stationary Solution to One-Dimensional Adsorbate-Induced Phase Transition Model