Qualitative properties of solutions for dual fractional parabolic equations involving nonlocal Monge-Ampère operator

Qualitative properties of solutions for dual fractional parabolic equations involving nonlocal Monge-Ampère operator

In this article, we mainly study the qualitative properties of solutions for dual fractional-order parabolic equations with nonlocal Monge-Ampère operators in different domains ∂tβμ(y,t)−Dατμ(y,t)=f(μ(y,t)).{\partial }_{t}^{\beta }\mu \left(y,t)-{D}_{\alpha }^{\tau }\mu \left(y,t)=f\left(\mu \left(y...

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Bibliographic Details
Main Authors: Yang Zerong, He Yong
Format: Article
Language:English
Published: De Gruyter 2025-06-01
Series:Advances in Nonlinear Analysis
Subjects:
dual parabolic equations
monotonicity
radial symmetry
nonexistence
liouville theorem
35r11
35b50
35b06
26a33
47g30
35b53
Online Access:https://doi.org/10.1515/anona-2025-0086
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Summary:In this article, we mainly study the qualitative properties of solutions for dual fractional-order parabolic equations with nonlocal Monge-Ampère operators in different domains ∂tβμ(y,t)−Dατμ(y,t)=f(μ(y,t)).{\partial }_{t}^{\beta }\mu \left(y,t)-{D}_{\alpha }^{\tau }\mu \left(y,t)=f\left(\mu \left(y,t)). We first establish a series of maximum principles and averaging effects theorems for antisymmetric functions and then used the method of moving planes and sliding planes to establish radial symmetry, monotonicity, nonexistence, and Liouville theorem for positive solutions.
ISSN:2191-950X

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