A1 Journal article (refereed)
Equivalent Definitions of Very Strict CD(K,N) -spaces (2023)
Schultz, T. (2023). Equivalent Definitions of Very Strict CD(K,N) -spaces. Journal of Geometric Analysis, 33(3), Article 108. https://doi.org/10.1007/s12220-022-01068-x
JYU authors or editors
Publication details
All authors or editors: Schultz, Timo
Journal or series: Journal of Geometric Analysis
ISSN: 1050-6926
eISSN: 1559-002X
Publication year: 2023
Publication date: 30/01/2023
Volume: 33
Issue number: 3
Article number: 108
Publisher: Springer
Publication country: United States
Publication language: English
DOI: https://doi.org/10.1007/s12220-022-01068-x
Publication open access: Openly available
Publication channel open access: Partially open access channel
Publication is parallel published (JYX): https://jyx.jyu.fi/handle/123456789/85364
Web address of parallel published publication (pre-print): https://arxiv.org/abs/1906.07693
Abstract
We show the equivalence of the definitions of very strict CD(K,N) -condition defined, on one hand, using (only) the entropy functionals, and on the other, the full displacement convexity class DCN. In particular, we show that assuming the convexity inequalities for the critical exponent implies it for all the greater exponents. We also establish the existence of optimal transport maps in very strict CD(K,N) -spaces with finite N.
Keywords: differential geometry
Free keywords: optimal transport; Ricci curvature; metric measure spaces
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Ministry reporting: Yes
Reporting Year: 2023
Preliminary JUFO rating: 2
