The overall project objectives are to produce new knowledge in the area of codim k bifurcations for continuous and discrete (smooth and non-smooth) dynamical systems and provide training in this area of research to early stage researchers. More exactly, we plan firstly to study degenerate two-dimensional Bautin bifurcation for the case when the second Lyapunov coefficient equals zero. Secondly, we aim to study degenerate four-dimensional Hopf-Hopf bifurcations. ​The third and fourth objectives are to study other codim k bifurcations in smooth and non-smooth dynamical systems arising from other bifurcations which bear or not a known name in the literature. In particular, we will focus on discontinuous piecewise differential systems, respectively, continuous and discrete non-smooth dynamical systems resulting from modelling oscillators with impacts. ​

This project has received funding from the European Union’s Horizon 2020 research and innovation programme under the Marie Skłodowska-Curie grant agreement No 777911.

This project will be developpled from 01/04/2018 to 31/03/2022.