%0 Journal Article
%T Some volume comparison theorems on Finsler manifolds of weighted Ricci curvature bounded below
%J Journal of Finsler Geometry and its Applications
%I University of Mohaghegh Ardabili
%Z 2783-0500
%A Cheng, Xinyue
%A Cheng, Hong
%A Zhang, Xibin
%D 2022
%\ 12/01/2022
%V 3
%N 2
%P 1-12
%! Some volume comparison theorems on Finsler manifolds of weighted Ricci curvature bounded below
%K volume comparison
%K the weighted Ricci curvature
%K Laplacian comparison theorem
%K distance function
%K volume coefficient
%R 10.22098/jfga.2022.11723.1072
%X This paper mainly studies the volume comparison in Finsler geometry under the condition that the weighted Ricci curvature Ric∞ has a lower bound. By using the Laplacian comparison theorems of distance function, we characterize the growth ratio of the volume coefficients. Further, some volume comparison theorems of Bishop-Gromov type are obtained.
%U https://jfga.uma.ac.ir/article_1928_f6c6d304b2cd56d0c1224267b439d5ae.pdf