Influence of sodium currents on speeds of traveling wave fronts in synaptically coupled neuronal networks

The main purpose of this paper is to apply mathematical analysis to investigate the influence of sodium currents on the speeds of traveling wave fronts. The authors use speed index functions to investigate the speeds of traveling wave fronts of some scalar integral differential equations arising from synaptically coupled neuronal networks. The mathematical model equation is ut+f(u)=α∫RK(x−y)H(u(y,t−1c|x−y|)−θ)dy, where 00α>0 and θ>0θ>0 are constants, satisfying the condition 0<2f(θ)<α0<2f(θ)<α. The function f(u)f(u) represents sodium currents, the function KK denotes synaptic coupling in a neuronal network, and the Heaviside step function HH is defined by H(u)=0H(u)=0 for all u<0u<0, H(0)=12 and H(u)=1H(u)=1 for all u>0u>0.