The solutions to a general class of axon partial differential equations proposed by FitzHugh which includes the Hodgkin-Huxley equations are studied. It is shown that solutions to the partial differential equations are exactly the solutions to a related set of integral equations. An iterative procedure for constructing the solutions based on standard methods for ordinary differential equations is given and each set of initial values is shown to lead to a unique solution. Continuous dependence of the solutions on the initial values is established and solutions with initial values in a restricted (physiological) range are shown to remain in that range for all time. The iterative procedure is not suggested as the basis for numerical integratio...
The aim of this paper is to determine the numerical solution of an equation which models the nerve c...
Introduction In this chapter we will discuss some practical and technical aspects of numerical meth...
In this paper we investigate the asymptotic spatial behavior of the solutions for several models for...
The solutions to a general class of axon partial differential equations proposed by FitzHugh which i...
The conditions when solutions of Huxley equation can be expressed in special form and the procedure ...
An analytic time series in the form of numerical solution (in an appropriate finite time interval) o...
The FitzHugh–Nagumo model is a reaction–diffusion equation describing the propagation of electrical ...
A circuit representation of the nerve axon membrane equations proposed by Hodgkin and Huxley is pres...
An analytic time series in the form of numerical solution (in an ap-propriate finite time interval) ...
Hodgkin-Huxley model is a system of four non-linear coupleddifferential equations which describes an...
The Hodgkin-Huxley model of the nerve axon describes excitation and propagation of the nerve impulse...
In the current paper a numerical approach is presented for solving a system of coupled gradient-diff...
In this paper, the authors investigate compound action potentials formed when the underlying tract's...
AbstractDouble pulse solutions are studied for nerve axon equations including a parameter μ. We assu...
Van der Pol's equation for a relaxation oscillator is generalized by the addition of terms to produc...
The aim of this paper is to determine the numerical solution of an equation which models the nerve c...
Introduction In this chapter we will discuss some practical and technical aspects of numerical meth...
In this paper we investigate the asymptotic spatial behavior of the solutions for several models for...
The solutions to a general class of axon partial differential equations proposed by FitzHugh which i...
The conditions when solutions of Huxley equation can be expressed in special form and the procedure ...
An analytic time series in the form of numerical solution (in an appropriate finite time interval) o...
The FitzHugh–Nagumo model is a reaction–diffusion equation describing the propagation of electrical ...
A circuit representation of the nerve axon membrane equations proposed by Hodgkin and Huxley is pres...
An analytic time series in the form of numerical solution (in an ap-propriate finite time interval) ...
Hodgkin-Huxley model is a system of four non-linear coupleddifferential equations which describes an...
The Hodgkin-Huxley model of the nerve axon describes excitation and propagation of the nerve impulse...
In the current paper a numerical approach is presented for solving a system of coupled gradient-diff...
In this paper, the authors investigate compound action potentials formed when the underlying tract's...
AbstractDouble pulse solutions are studied for nerve axon equations including a parameter μ. We assu...
Van der Pol's equation for a relaxation oscillator is generalized by the addition of terms to produc...
The aim of this paper is to determine the numerical solution of an equation which models the nerve c...
Introduction In this chapter we will discuss some practical and technical aspects of numerical meth...
In this paper we investigate the asymptotic spatial behavior of the solutions for several models for...