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https://doi.org/10.1093/qjmath/52.2.171
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Cite Journal: The Quarterly Journal of Mathematics |  Publication Date: Jul 1, 2001 |
 Citations: 65 |
Li and Yau type two‐sided heat kernel bounds are obtained for symmetric diffusions under a curvature–dimension condition, where the heat kernel upper bound is established for a more general case. As an application, the compactness of manifolds is studied using heat kernels. In particular, a conjecture by Bueler is proved.
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