Method of Centre Manifold from Bifurcation Theory

bifurcations theory- neural field- stable manifold- differential equations

Authors

  • Dr. Basher Suleiman Othman Assistant Professor Department of Mathematics College of Sciences & Arts in Qilwah Qilwah-Al-Baha University -Saudi Arabia, Saudi Arabia
Vol. 7 No. 10 (2019)
Mathematics and Statistics
October 30, 2019

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The aim of this paper is to introduce tools from bifurcation theory is necessary in ways in our life particularly in the study of neural field equations set in the primary visual cortex. So we deal with saddle-node, trans- critical, pitchfork and Hopf. Bifurcations as an elementary bifurcation; directly related to the center manifold theory which is a canonical way to write differential equations.

We conclude this paper with an overview of bifurcations with symmetry by solving some problems and giving Branching Lemma as the equivariant result