学术报告（潘会平 5.12）

摘要：

Teichmuller space admits several ray structures, such as the Teichmuller geodesic ray, Thurston stretch ray, harmonic map (dual) ray, grafting ray, etc. In the first part of this talk, we will depict harmonic map ray structures on Teichmuller space as a geometric transition between Teichmuller ray structures and Thurston geodesic ray structures. In particular, by appropriately degenerating the source of a harmonic map between hyperbolic surfaces, the harmonic map rays through the target converge to a Thurston geodesic; by appropriately degenerating the target of the harmonic map, those harmonic map dual rays through the domain converge to a Teichmuller geodesic. In the second part, we will discuss applications to Thurston metric. While there may be many Thurston metric geodesics between a pair of ordered points in Teichmuller space, we select a unique Thurston geodesic through those points in a canonical way. This allows us to define two versions of (co)-geodesic flows on the cotangent bundle over the Teichmuller space under the Thurston metric. This is a joint work with Michael Wolf.