Title: Pressure Metrics for Deformation Spaces of Quasifuchsian Groups with Parabolics
Speaker: Lien-Yung “Nyima” Kao – George Washington University
Abstract: Thurston pointed out that one can use variations of lengths of closed geodesics on hyperbolic surfaces to construct a Riemannian metric on the Teichmueller space. When the surface is closed, Wolpert showed that Thurston’s construction recovers the Weil-Petersson metric. Using thermodynamic formalism, McMullen proposed a new perspective to this Riemannian metric, and called it the pressure metric. In this talk, I will discuss how to extend this dynamical construction to spaces of quasiconformal deformations of (non-compact) finite area hyperbolic surfaces. This is a joint work with Harry Bray and Dick Canary.
Zoom recording available here
Pdf of slides available here
UPDATE: We will continue our program in Spring 2021. However, we are taking a brief Winter hiatus. We expect to resume in February.
We are pleased to announce that we will be running an online seminar program in Fall 2020. The seminar will take place in our usual time slot unless otherwise noted – Thursdays 3.00pm (EST). Some seminars are scheduled at an alternate time of Friday 12.40pm (EST).
Please contact the organizers for a Zoom link.
Our current schedule for the semester follows:
Sept 17: Lien-Yung “Nyima” Kao (George Washington University)
Oct 2 (Friday, 1pm EST): Tushar Das (University of Wisconsin)
Oct 9 (Friday, 12.40pm EST): Mark Demers (Fairfield University)
Oct 16 (Friday, 12.40pm EST): Tianyu Wang (Ohio State)
Oct 22: Andrew Best (Ohio State)
Oct 29: Tamara Kucherenko (City College of New York)
Nov 12: Shahriah Mirzadeh (Michigan State)
Nov 19: Yeor Hafuta (Ohio State)
Dec 3: Nikos Frantzikinakis (University of Crete)