Remarks on curvature dimension conditions on graphs
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- 作者:Florentin Münch
- 关键词:Mathematics Subject Classification53C21 ; 05C81 ; 35K05
- 刊名:Calculus of Variations and Partial Differential Equations
- 出版年:2017
- 出版时间:February 2017
- 年:2017
- 卷:56
- 期:1
- 全文大小:
- 刊物类别:Mathematics and Statistics
- 刊物主题:Analysis; Systems Theory, Control; Calculus of Variations and Optimal Control; Optimization; Theoretical, Mathematical and Computational Physics;
- 出版者:Springer Berlin Heidelberg
- ISSN:1432-0835
- 卷排序:56
文摘
We show a connection between the \(CDE'\) inequality introduced in Horn et al. (Volume doubling, Poincaré inequality and Gaussian heat kernel estimate for nonnegative curvature graphs. arXiv:1411.5087v2, 2014) and the \(CD\psi \) inequality established in Münch (Li–Yau inequality on finite graphs via non-linear curvature dimension conditions. arXiv:1412.3340v1, 2014). In particular, we introduce a \(CD_\psi ^\varphi \) inequality as a slight generalization of \(CD\psi \) which turns out to be equivalent to \(CDE'\) with appropriate choices of \(\varphi \) and \(\psi \). We use this to prove that the \(CDE'\) inequality implies the classical CD inequality on graphs, and that the \(CDE'\) inequality with curvature bound zero holds on Ricci-flat graphs.