Fractal analysis of degenerate spiral trajectories of a class of ordinary differential equations

“…S −1 ) tends to +∞ for C < 0 (resp. C > 0), U is Minkowski nondegenerate and dim B U is given in (15) or (16).…”

“…A fractal analysis of planar contact points (e.g. slow-fast Hopf point), based on the same slow relation function approach, can be found in [5,15]. We point out that [5] gives a simple fractal method for detection of the first non-zero Lyapunov coefficient in slow-fast Hopf bifurcations.…”

Fractal codimension of nilpotent contact points in two-dimensional slow-fast systems

“…S −1 ) tends to +∞ for C < 0 (resp. C > 0), U is Minkowski nondegenerate and dim B U is given in (15) or (16).…”

“…A fractal analysis of planar contact points (e.g. slow-fast Hopf point), based on the same slow relation function approach, can be found in [5,15]. We point out that [5] gives a simple fractal method for detection of the first non-zero Lyapunov coefficient in slow-fast Hopf bifurcations.…”

Fractal codimension of nilpotent contact points in two-dimensional slow-fast systems

On initial value problems of fractal delay equations

Influence of nonlinearity to box-counting dimensions of spiral orbits for two-dimensional differential systems