On the ergodicity of the frame flow on even-dimensional manifolds

Mihajlo Cekić, Thibault Lefeuvre, Andrei Moroianu, Uwe Semmelmann

Published 2021-11-29, updated 2023-02-05Version 2

It is known that the frame flow on a closed $n$-dimensional Riemannian manifold with negative sectional curvature is ergodic if $n$ is odd and $n \neq 7$. In this paper we study its ergodicity for $n \geq 4$ even and $n = 7$, and we show that: if $n \equiv 2$ mod $4$, or $n=4$, the frame flow is ergodic if the manifold is $\sim 0.3$-pinched, if $n \equiv 0$ mod $4$, it is ergodic if the manifold is $\sim 0.6$-pinched, except in the three dimensions $n=7,8,134$, where the respective pinching conditions are $0.4962...$, $0.6212...$, and $0.5788...$. In particular, if $n = 4$ or $n \equiv 2$ mod $4$, this almost solves a long-standing conjecture of Brin asserting that $1/4$-pinched even-dimensional manifolds have an ergodic frame flow.