Rate of convergence for reaction–diffusion equations with nonlinear Neumann boundary conditions and $${\mathcal {C}}^1$$ variation of the domain
IF 1.1
3区 数学
Q1 MATHEMATICS
引用次数: 0
Abstract
In this paper, we propose the compact convergence approach to deal with the continuity of attractors of some reaction–diffusion equations under smooth perturbations of the domain subject to nonlinear Neumann boundary conditions. We define a family of invertible linear operators to compare the dynamics of perturbed and unperturbed problems in the same phase space. All continuity arising from small smooth perturbations will be estimated by a rate of convergence given by the domain variation in a \({\mathcal {C}}^1\) topology.
具有非线性诺伊曼边界条件和 $${\mathcal {C}}^1$ 域变化的反应扩散方程的收敛速率
在本文中,我们提出了紧凑收敛法来处理某些反应扩散方程在非线性诺伊曼边界条件下的平滑扰动域吸引子的连续性问题。我们定义了一个可逆线性算子族,用于比较同一相空间中受扰动问题和未受扰动问题的动力学。所有由微小平滑扰动引起的连续性都将由\({\mathcal {C}}^1\) 拓扑中的域变化给出的收敛率来估计。
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来源期刊
CiteScore
2.30
自引率
7.10%
发文量
90
审稿时长
>12 weeks
期刊介绍:
The Journal of Evolution Equations (JEE) publishes high-quality, peer-reviewed papers on equations dealing with time dependent systems and ranging from abstract theory to concrete applications.
Research articles should contain new and important results. Survey articles on recent developments are also considered as important contributions to the field.
Particular topics covered by the journal are:
Linear and Nonlinear Semigroups
Parabolic and Hyperbolic Partial Differential Equations
Reaction Diffusion Equations
Deterministic and Stochastic Control Systems
Transport and Population Equations
Volterra Equations
Delay Equations
Stochastic Processes and Dirichlet Forms
Maximal Regularity and Functional Calculi
Asymptotics and Qualitative Theory of Linear and Nonlinear Evolution Equations
Evolution Equations in Mathematical Physics
Elliptic Operators
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