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Communications in Analysis and Geometry
Volume 29 (2021)
Number 2
Entropy, noncollapsing, and a gap theorem for ancient solutions to the Ricci flow
Pages: 501 – 524
DOI: https://dx.doi.org/10.4310/CAG.2021.v29.n2.a8
Author
Abstract
In this paper we discuss the asymptotic entropy for ancient solutions to the Ricci flow. We prove a gap theorem for ancient solutions, which could be regarded as an entropy counterpart of Yokota’s work. In addition, we prove that under some assumptions on one time slice of a complete ancient solution with nonnegative curvature operator, finite asymptotic entropy implies $\kappa$‑noncollapsing on all scales. This result is used by the author [21] to prove Perelman’s assertion that on an ancient solution to the Ricci flow with bounded nonnegative curvature operator, bounded entropy is equivalent to noncollapsing on all scales; see section 11 in [17].
Received 20 May 2017
Accepted 7 August 2018
Published 19 April 2021