Global bifurcation of waves

The FitzHugl-Nagurno equations for action potential propagation along nerve axons and the corresponding ordinary differential equations for travelling waves are solved numerically. Above a critical value, a constant bias current can drive a wave-front solution. At the critical value, a global bifurc

We study global bifurcation for the following nonlinear equation: satisfying certain conditions on a, g, and f when µ 0 is not an eigenvalue of the above divergence form. It is based on a bifurcation result on noncompact components of solutions for nonlinear operator equations.

We consider the structure of the solution set of a nonlinear Sturm-Liouville boundary value problem defined on a general time scale. Using global bifurcation theory we show that unbounded continua of nontrivial solutions bifurcate from the trivial solution at the eigenvalues of the linearization, an