Abstract
Nagumo's nerve conduction equation has a one-parameter family of spatially periodic travelling wave solutions. First, we prove the existence of these solutions by using a topological method. (There are some exceptional cases in which this method cannot be applied in showing the existence.) A periodic travelling wave solution corresponds to a closed orbit of a third-order dynamical system. The Poincare index of the closed orbit is determined as a direct consequence of the proof of the existence. Second, we prove that the periodic travelling wave solution is unstable if the Poincare index of the corresponding closed orbit is + 1. By using this result, together with the result of the author's previous paper, it is concluded that “the slow periodic travelling wave solutions” are always unstable. Third, we consider the stability of “the fast periodic travelling wave solutions”. We denote by L(c) the spatial period of the travelling wave solution with the propagation speed c. It is shown that the fast solution is unstable if its period is close to Lmin, the minimum of L(c).
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