Some local maximum principles along Ricci flows
Canadian journal of mathematics, Tome 74 (2022) no. 2, pp. 329-348
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In this work, we obtain a local maximum principle along the Ricci flow $g(t)$ under the condition that $\mathrm {Ric}(g(t))\le {\alpha } t^{-1}$ for $t>0$ for some constant ${\alpha }>0$. As an application, we will prove that under this condition, various kinds of curvatures will still be nonnegative for $t>0$, provided they are non-negative initially. These extend the corresponding known results for Ricci flows on compact manifolds or on complete noncompact manifolds with bounded curvature. By combining the above maximum principle with the Dirichlet heat kernel estimates, we also give a more direct proof of Hochard’s [15] localized version of a maximum principle by Bamler et al. [1] on the lower bound of different kinds of curvatures along the Ricci flows for $t>0$.
Lee, Man-Chun; Tam, Luen-Fai. Some local maximum principles along Ricci flows. Canadian journal of mathematics, Tome 74 (2022) no. 2, pp. 329-348. doi: 10.4153/S0008414X20000772
@article{10_4153_S0008414X20000772,
author = {Lee, Man-Chun and Tam, Luen-Fai},
title = {Some local maximum principles along {Ricci} flows},
journal = {Canadian journal of mathematics},
pages = {329--348},
year = {2022},
volume = {74},
number = {2},
doi = {10.4153/S0008414X20000772},
url = {http://geodesic.mathdoc.fr/articles/10.4153/S0008414X20000772/}
}
TY - JOUR AU - Lee, Man-Chun AU - Tam, Luen-Fai TI - Some local maximum principles along Ricci flows JO - Canadian journal of mathematics PY - 2022 SP - 329 EP - 348 VL - 74 IS - 2 UR - http://geodesic.mathdoc.fr/articles/10.4153/S0008414X20000772/ DO - 10.4153/S0008414X20000772 ID - 10_4153_S0008414X20000772 ER -
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