Abstract
How large can be the width of Riemannian three-spheres of the same volume in the same conformal class? If a maximum value is attained, how does a maximising metric look like? What happens as the conformal class changes? In this paper, we investigate these and other related questions, focusing on the context of Simon–Smith min‑max theory.
Citation
Lucas Ambrozio. Rafael Montezuma. "On the min-max width of unit volume three-spheres." J. Differential Geom. 126 (3) 875 - 907, March 2024. https://doi.org/10.4310/jdg/1717348867
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