Abstract
In this article the qualitative properties of numerical traveling wave solutions for integro- differential equations, which generalize the well known Fisher equation are studied. The integro-differential equation is replaced by an equivalent hyperbolic equation which allows us to characterize the numerical velocity of traveling wave solutions. Numerical results are presented.
Acknowledgment
This work has been supported by Centro de Matemática da Universidade de Coimbra and POCTI/35039/MAT/2000.