Norbert Schappacher (Strasbourg), Marie-Françoise Roy (Rennes)
Alberto Abbondandolo (Ruhr Universität Bochum), Nils Waterstraat (University of Kent)
Alberto Abbondandolo (Ruhr Universität Bochum)
On short geodesics and shadows of balls
How large is the four-dimensional shadow of a symplectic ball? And how long can the shortest closed geodesic on a two-sphere be? After introducing the necessary background, I will show how these two questions can be put into a common framework using a particular class of Hamiltonian dynamical systems known as Reeb flows.
Nils Waterstraat (University of Kent)
The buckling of the Euler rod
Columns fail by buckling when their critical load is reached, a phenomenon that can be explained in the framework of bifurcation theory, which attempts to explain various phenomena that have been discovered and described in the natural sciences over the centuries. Another classical example is the appearance of Taylor vortices, and often Hamiltonian systems play a central role.
Mathematically speaking, bifurcation theory is a field of nonlinear analysis that studies branches of solutions of equations of the type $F(\lambda,x)=0$, where $F:[0,1]\times X\rightarrow Y$ is a continuous map and $X,Y$ are real Banach spaces.
The aim of this talk is to show that concepts of global analysis, like the spectral flow, can be used to investigate bifurcation phenomena. Moreover, we discuss an application to bifurcation of periodic orbits of Hamiltonian systems.