Vanishing diffusion limits for planar fronts in bistable models with saturation

Abstract

We deal with heteroclinic planar fronts for parameter-dependent reaction-diffusion equations with bistable reaction and saturating diffusive term like ut=ε \, div\, (∇ u1+ ∇ u 2) + f(u), u=u(x, t), \; x ∈ Rn, \, t ∈ R, analyzing in particular their behavior for ε 0. First, we construct monotone and non-monotone planar traveling waves, using a change of variables allowing to analyze a two-point problem for a suitable first-order reduction; then, we investigate their asymptotic behavior for ε 0, showing in particular that the convergence of the critical fronts to a suitable step function may occur passing through discontinuous solutions.