Universal inequalities of the poly-drifting Laplacian on smooth metric measure spaces

Hou Lanbao; Du Feng; Mao Jing; Wu Chuanxi

doi:10.1515/math-2021-0100

Open Mathematics (Oct 2021)

Universal inequalities of the poly-drifting Laplacian on smooth metric measure spaces

Hou Lanbao,
Du Feng,
Mao Jing,
Wu Chuanxi

Affiliations

Hou Lanbao: Faculty of Mathematics and Statistics, Key Laboratory of Applied Mathematics of Hubei Province, Hubei University, Wuhan 430062, China
Du Feng: School of Mathematics and Physics Science, Jingchu University of Technology, Jingmen, 448000, China
Mao Jing: Faculty of Mathematics and Statistics, Key Laboratory of Applied Mathematics of Hubei Province, Hubei University, Wuhan 430062, China
Wu Chuanxi: Faculty of Mathematics and Statistics, Key Laboratory of Applied Mathematics of Hubei Province, Hubei University, Wuhan 430062, China

DOI: https://doi.org/10.1515/math-2021-0100
Journal volume & issue: Vol. 19, no. 1
pp. 1110 – 1119

Abstract

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In this paper, we study the eigenvalue problem of poly-drifting Laplacian on complete smooth metric measure space (M,⟨,⟩,e−ϕdv)\left(M,\langle ,\rangle ,{e}^{-\phi }{\rm{d}}v), with nonnegative weighted Ricci curvature Ricϕ≥0{{\rm{Ric}}}^{\phi }\ge 0 for some ϕ∈C2(M)\phi \in {C}^{2}\left(M), which is uniformly bounded from above, and successfully obtain several universal inequalities of this eigenvalue problem.

Published in Open Mathematics

ISSN: 2391-5455 (Online)
Publisher: De Gruyter
Country of publisher: Poland
LCC subjects: Science: Mathematics
Website: https://www.degruyter.com/journal/key/math/html

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