报告题目: Simplest bifurcation diagrams for families of vector fields on a torus
报告人 Claude Baesens 教授(University of Warwick)
报告时间 2017年8月4日10:30-11:30
报告地点 维格堂113
报告摘要 We prove that the bifurcation diagram for a monotone two-parameter family of vector fields on a torus has to be at least as complicated as the conjectured simplest one proposed in [BGKM]. To achieve this we define ``simplest'' by minimising sequentially the numbers of equilibria, Bogdanov-Takens points, closed curves of
centre and of neutral saddle, intersections of curves of centre and neutral saddle, Reeb components, other invariant annuli, arcs of rotational homoclinic bifurcation of horizontal homotopy type, necklace points, contractible periodic orbits, points of neutral horizontal homoclinic bifurcation and half-plane fan points. We obtain two types of simplest case, including that initially proposed. [BM1]
We analyse the bifurcation diagram of the explicit monotone family $/dot{x} = /Omega_x - /cos{2/pi y} - /eps /cos{2/pi x$, $/dot{y} = /Omega_y - /sin{2/pi y} - /eps /sin{2/pi x$ and prove it satisfies all the assumptions on simplest bifurcation diagram except the one of at most one contractible periodic orbit. Indeed we find that it has four points of degenerate Hopf bifurcation [BM2]
References:
[BGKM] C Baesens, J Guckenheimer, S Kim, RS MacKay,Three coupled oscillators: mode-locking, global bifurcations and toroidal chaos, Physica D 49 (1991) 387-475.
[BM1] C Baesens and RS MacKay, Simplest bifurcation diagrams for monotone families of vector fields on a torus
[BM2] C Baesens and RS MacKay, An almost simplest monotone family of vector fields on a torus