$Radial symmetry, monotonicity and Liouville theorem for Marchaud fractional parabolic equations with the nonlocal Bellman operator$

Radial symmetry, monotonicity and Liouville theorem for Marchaud fractional parabolic equations with the nonlocal Bellman operator

In this article, we focus on studying space-time fractional parabolic equations with the nonlocal Bellman operator and the Marchaud fractional derivative. To address the difficulty caused by the space-time non-locality of operator ∂tα−Fs ${\partial }_{t}^{\alpha }-{F}_{s}$ , we first establish the n...

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Bibliographic Details
Main Authors:	Liu Mengru, Zhang Lihong, Wang Guotao
Format:	Article
Language:	English
Published:	De Gruyter 2025-06-01
Series:	Advanced Nonlinear Studies
Subjects:	space-time fractional parabolic equations nonlocal bellman operator radial symmetry and monotonicity liouville theorem direct method of moving planes 35r11 47g30 35b50 35b53
Online Access:	https://doi.org/10.1515/ans-2023-0191
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