A note on the almost-Schur lemma on smooth metric measure spaces
Abstract In this paper, we prove almost-Schur inequalities on closed smooth metric measure spaces, which implies the results of Cheng and De Lellis–Topping whenever the weighted function f is constant.
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Online Access: | http://link.springer.com/article/10.1186/s13660-018-1791-y |
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doaj-b0fb257a7e8043c68ab16b784d8572f92020-11-24T21:28:36ZengSpringerOpenJournal of Inequalities and Applications1029-242X2018-07-012018111310.1186/s13660-018-1791-yA note on the almost-Schur lemma on smooth metric measure spacesJui-Tang Chen0Department of Mathematics, National Taiwan Normal UniversityAbstract In this paper, we prove almost-Schur inequalities on closed smooth metric measure spaces, which implies the results of Cheng and De Lellis–Topping whenever the weighted function f is constant.http://link.springer.com/article/10.1186/s13660-018-1791-yAlmost-Schur inequalityEinstein manifoldSmooth metric measure space |
collection |
DOAJ |
language |
English |
format |
Article |
sources |
DOAJ |
author |
Jui-Tang Chen |
spellingShingle |
Jui-Tang Chen A note on the almost-Schur lemma on smooth metric measure spaces Journal of Inequalities and Applications Almost-Schur inequality Einstein manifold Smooth metric measure space |
author_facet |
Jui-Tang Chen |
author_sort |
Jui-Tang Chen |
title |
A note on the almost-Schur lemma on smooth metric measure spaces |
title_short |
A note on the almost-Schur lemma on smooth metric measure spaces |
title_full |
A note on the almost-Schur lemma on smooth metric measure spaces |
title_fullStr |
A note on the almost-Schur lemma on smooth metric measure spaces |
title_full_unstemmed |
A note on the almost-Schur lemma on smooth metric measure spaces |
title_sort |
note on the almost-schur lemma on smooth metric measure spaces |
publisher |
SpringerOpen |
series |
Journal of Inequalities and Applications |
issn |
1029-242X |
publishDate |
2018-07-01 |
description |
Abstract In this paper, we prove almost-Schur inequalities on closed smooth metric measure spaces, which implies the results of Cheng and De Lellis–Topping whenever the weighted function f is constant. |
topic |
Almost-Schur inequality Einstein manifold Smooth metric measure space |
url |
http://link.springer.com/article/10.1186/s13660-018-1791-y |
work_keys_str_mv |
AT juitangchen anoteonthealmostschurlemmaonsmoothmetricmeasurespaces AT juitangchen noteonthealmostschurlemmaonsmoothmetricmeasurespaces |
_version_ |
1725969532536750080 |