Drawstrings and flexibility in the Geroch conjecture
Abstract
In this paper, we observe new phenomena related to the structure of 3-manifolds satisfying lower scalar curvature bounds. We construct warped-product manifolds of almost nonnegative scalar curvature that converge to pulled string spaces in the Sormani-Wenger intrinsic flat topology. These examples extend the results of Lee-Naber-Neumayer \cite{LNN} to the case of dimension . As a consequence, we produce the first counterexample to a conjecture of Sormani \cite{SormaniConj} on the stability of the Geroch Conjecture. Our example tests the appropriate hypothesis for a related conjecture of Gromov. On the other hand, we demonstrate a -stability statement () for the Geroch Conjecture in the class of warped products.
Cite
@article{arxiv.2309.03756,
title = {Drawstrings and flexibility in the Geroch conjecture},
author = {Demetre Kazaras and Kai Xu},
journal= {arXiv preprint arXiv:2309.03756},
year = {2023}
}
Comments
A second proof of Theorem 3.1 was added. The exposition of the introduction was improved. 33 pages, 4 figures, comments welcome