arXiv:2310.02808 Abstract | arXiv Analytics

arXiv:2310.02808 [math.PR]Abstract References Reviews Resources

Probabilistic Method to Fundamental gap problems on the sphere

Published 2023-10-04Version 1

We provide a probabilistic proof of the fundamental gap estimate for Schr\"odinger operators in convex domains on the sphere, which extends the probabilistic proof of F. Gong, H. Li, and D. Luo for the Euclidean case. Our results further generalize the results achieved for the Laplacian by S. Seto, L. Wang, and G. Wei, as well as by C. He, G. Wei, and Qi S. Zhang. The essential ingredient in our analysis is the reflection coupling method on Riemannian manifolds.

Categories: math.PR, math.DG

Keywords: fundamental gap problems, probabilistic method, probabilistic proof, fundamental gap estimate, convex domains

Related articles: Most relevant | Search more

arXiv:2004.02763 [math.PR] (Published 2020-04-06)

A probabilistic proof of the finite geometric series

Raju Dey, Suchandan Kayal

arXiv:1808.04964 [math.PR] (Published 2018-08-15)

A Probabilistic Proof of the Perron-Frobenius Theorem

Peter W. Glynn, Paritosh Y. Desai

arXiv:math/0701584 [math.PR] (Published 2007-01-21, updated 2007-11-29)

Meinardus' theorem on weighted partitions: extensions and a probabilistic proof

Boris L. Granovsky, Dudley Stark, Michael Erlihson