Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
1897401 | Physica D: Nonlinear Phenomena | 2006 | 19 Pages |
We consider an impacting mechanical system in which a particle at position u(t)u(t) impacts with a periodically moving obstacle at position z(t)z(t), the motion of which is non-smooth. In particular we look at corner events when uu impacts with zz very close to a point where zz loses smoothness. We show that this leads, through a corner bifurcation , to complex dynamics in uu which can include periodic orbits of arbitrary period and period-adding cascades. By analysing associated maps close to the corner event, we show that this dynamics can be understood in terms of the iterations of a two-dimensional, piecewise linear, discontinuous map. We also show some links between this analysis and the difficult problem of understanding the motion of three objects which may have simultaneous impacts.