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Comparison theorems on Finsler manifolds with weighted Ricci curvature bounded below |
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| Authors: | Songting Yin |
| Institution: | Department of Mathematics and Computer Science, Tongling University, Tongling 244000, China |
| Abstract: | We obtain the Laplacian comparison theorem and the Bishop-Gromov comparison theorem on a Finsler manifold with the weighted Ricci curvature Ric∞ bounded below. As applications, we prove that if the weighted Ricci curvature Ric∞ is bounded below by a positive number, then the manifold must have finite fundamental group, and must be compact if the distortion is also bounded. Moreover, we give the Calabi-Yau linear volume growth theorem on a Finsler manifold with nonnegative weighted Ricci curvature. |
| Keywords: | Finsler manifold distortion S-curvature weighted Ricci curvature comparison theorem |
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