MIT PDE/Analysis Seminar

Fall 2026

Organizers: Aleksandr Logunov, Christoph Kehle, and Larry Guth

Tuesdays 3 PM to 4 PM in Room 2-136

July 014 PM - 5 PM in 2-361 Tristan Humbert(Colin Guillarmou and Thibault Lefeuvre)

Generic twisted Pollicott--Ruelle resonances at zero

Abstract:

Let (Σ, g) be a closed Riemannian surface of genus G with Anosov geodesic flow. Given an irreducible finite-dimensional representation ρ of the fundamental group of its unit tangent bundle M, we can consider the twisted Ruelle zeta function ζρ(s). The zeta function ζρ(s) admits a meromorphic extension to the whole complex plane whose poles and zeros can be computed from the (twisted) Pollicott–Ruelle spectrum of (g, ρ).

We show that for a generic choice of ρ, ζρ vanishes at s = 0 to order dim(ρ)(2G − 2) if ρ factors through π1(Σ) and does not vanish otherwise. In the second case, we further show that ζρ(0) is given by the Reidemeister–Turaev torsion, thus extending Fried's conjecture to a generic set of acyclic (but not necessarily unitary) representations. In higher dimensions, we compute the order of vanishing of the untwisted zeta function in an open and dense subset of Anosov metrics in the connected component of a hyperbolic 3-metric.

This is joint work with Zhongkai Tao.