On the existence and regularity of admissibly inertial manifolds with sectorial operators

Pub Date : 2022-03-09 DOI:10.1080/14689367.2022.2049706
Thieu Huy Nguyen, X. Bui
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Abstract

Motivated by a predator–prey model with cross-diffusion, we consider the evolution equation of the form where the linear operator is a sectorial operator having a gap in its spectrum. We prove the existence of an admissibly inertial manifold for such an evolution equation in the case of the spectrum of contains an isolated subset which is sufficiently far from the rest, and the nonlinear term f satisfies φ-Lipschitz condition for φ belonging to some admissible space. Next, we will study the regularity of such admissibly inertial manifolds. We then apply the obtained result to the above-mentioned predator–prey model.
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关于具有扇形算子的可容许惯性流形的存在性和正则性
在具有交叉扩散的捕食者-猎物模型的激励下,我们考虑了线性算子是谱中有间隙的扇形算子形式的进化方程。我们证明了这样一个演化方程的可容许惯性流形的存在性,在的谱包含一个离其余子集足够远的孤立子集的情况下,并且非线性项f满足φ-Lipschitz条件,φ属于某个可容许空间。接下来,我们将研究这种可容许惯性流形的正则性。然后,我们将获得的结果应用于上述捕食者-猎物模型。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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