Gromov hyperbolicity II: Dimension-free inner uniform estimates for quasigeodesics

Abstract

This is the second article of a series of our recent works, addressing an open question of Bonk-Heinonen-Koskela [3], to study the relationship between (inner) uniformality and Gromov hyperbolicity in infinite dimensional spaces. Our main focus of this paper is to establish a dimension-free inner uniform estimate for quasigeodesics. More precisely, we prove that a c0-quasigeodesic in a δ-Gromov hyperbolic c-John domain in Rn is b-inner uniform, for some constant b depending only on c0, δ and c, but not on the dimension n. The proof relies crucially on the techniques introduced by Guo-Huang-Wang in their recent work [arXiv:2502.02930, 2025]. In particular, we actually show that the above result holds in general Banach spaces, which answers affirmatively an open question of J. V\"ais\"al\"a in [Analysis, 2004] and partially addresses the open question of Bonk-Heinonen-Koskela in [Asterisque, 2001]. As a byproduct of our main result, we obtain that a c0-quasigeodesic in a δ-Gromov hyperbolic c-John domain in Rn is a b-cone arc with a dimension-free constant b=b(c0,δ,c). This resolves an open problem of J. Heinonen in [Rev. Math. Iberoam., 1989].