Uniqueness and nonuniqueness of fronts for degenerate diffusion-convection reaction equations

• Main Authors: Diego Berti, Andrea Corli, Luisa Malaguti
• Format: Article
• Language: English
• Published: University of Szeged 2020-11-01
• Series: Electronic Journal of Qualitative Theory of Differential Equations
• Subjects: degenerate and doubly degenerate diffusivity; diffusion-convection-reaction equations; traveling-wave solutions; sharp profiles; semi-wavefronts
• Online Access: http://www.math.u-szeged.hu/ejqtde/periodica.html?periodica=1&paramtipus_ertek=publication&param_ertek=8643
• ISSN: 1417-3875; 1417-3875

We consider a scalar parabolic equation in one spatial dimension. The equation is constituted by a convective term, a reaction term with one or two equilibria, and a positive diffusivity which can however vanish. We prove the existence and several properties of traveling-wave solutions to such an equation. In particular, we provide a sharp estimate for the minimal speed of the profiles and improve previous results about the regularity of wavefronts. Moreover, we show the existence of an infinite number of semi-wavefronts with the same speed.