FitzHugh-Naguma equation: from global dynamics to slow-fast syetem

Abstract: We concentrate our attention on the qualitative study of the phase portraits of the three-parameter FitzHugh-Nagumo family and its compactification. We divide the study into three scenarios based on the parameters. One of the scenarios is characterised by the existence of a double-zero bifurcation with Z2 symmetry (a singularity of codimension two). In this case, we explicitly exhibit the pitchfork, Hopf, Belyakov, and double homoclinic bifurcation/transition curves unfolding the singularity of codimension two and plot the bifurcation diagrams. We bridge this analysis with the theory on the associated slow-fast family and the existence of canards. We complete our study with the global compactification of the phase portraits for the family under consideration. This study complements the work summarised in Georgescu, Rocsoreanu and Giurgic Teanu, "Global Bifurcations in FitzHugh-Nagumo Model", Trends in Mathematics: Bifurcations, Symmetry and Patterns (2003).