Spectral analysis and asymptotic decay of the solutions to multilayered structure-Stokes fluid interaction PDE system

作     者：Geredeli, Pelin G. 

作者机构：Clemson Univ Sch Math & Stat Sci Clemson SC 29634 USA 

出 版 物：《JOURNAL OF DIFFERENTIAL EQUATIONS》 (J. Differ. Equ.)

年 卷 期：2025年第427卷

页      面：1-25页

核心收录：

学科分类：07[理学] 0701[理学-数学] 070101[理学-基础数学] 

基　　金：National Science Foundation NSF [DMS-2348312] 

主　　题：Fluid-structure interaction Stokes flow Stability 

摘      要：In this work, the dynamics of a multilayered structure-fluid interaction (FSI) PDE system is considered. Here, the coupling of 3D Stokes and 3D elastic dynamics is realized via an additional 2D elastic equation on the boundary interface. Such modeling PDE systems appear in the mathematical modeling of eukaryotic cells and vascular blood flow in mammalian arteries. We analyze the long time behavior of solutions to such FSI coupled system in the sense of strong stability. Our proof is based on an analysis of the spectrum of the associated semigroup generator A which in particular entails the elimination of all three parts of the spectrum of A from the imaginary axis. In order to avoid steady states in our stability analysis, we firstly show that zero is an eigenvalue for the operator A, and we provide a characterization of the (one dimensional) zero eigenspace Null(A). In turn, we address the issue of asymptotic decay of the solution to the zero state for any initial data taken from the orthogonal complement of the zero eigenspace Null(A)L. (c) 2025 The Author(s). Published by Elsevier Inc. This is an open access article under the CC BY-NC-ND license (http://***/licenses/by-nc-nd/4.0/).