Infinite Staircases in Symplectic Embeddings

Ana Rita Pires

McDuff and Schlenk studied an embedding capacity function, which describes when a 4-dimensional ellipsoid can symplectically embed into a 4-ball. The graph of this function includes an infinite staircase related to the odd index Fibonacci numbers. Infinite staircases have been shown to exist also in the graphs of the embedding capacity functions when the target manifold is a polydisk or the ellipsoid E(2,3).

http://scgp.stonybrook.edu/video_portal/video.php?id=3177

Simons- Workshop: Quantitative Symplectic Geometry