Geometric inverse problem for the nonstationary Stokes equations using topological sensitivity analysis

Rakia Malek; Mohamed Abdelwahed; Nejmeddine Chorfi; Maatoug Hassine

doi:10.1002/mma.6394

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Geometric inverse problem for the nonstationary Stokes equations using topological sensitivity analysis

Journal article

Peer reviewed

Geometric inverse problem for the nonstationary Stokes equations using topological sensitivity analysis

Rakia Malek, Mohamed Abdelwahed, Nejmeddine Chorfi and Maatoug Hassine

Mathematical methods in the applied sciences

07/04/2020

DOI: https://doi.org/10.1002/mma.6394

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

We study in this paper a geometric inverse problem in fluid mechanics. The goal is to determine the location of an object in the fluid domain from boundary information. We consider the case of a nonstationary two-dimensional Stokes flow. Our approach is based on the Kohn-Vogelius concept and the topological gradient method. We develop a new topological asymptotic expansion, which can be used as a basic step for developing accurate detection algorithms.

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Title: Geometric inverse problem for the nonstationary Stokes equations using topological sensitivity analysis
Creators - without role: Rakia Malek - University of Monastir
Mohamed Abdelwahed - King Saud University
Nejmeddine Chorfi - King Saud University
Maatoug Hassine - University of Monastir
Publication Details: Mathematical methods in the applied sciences
Publisher: Wiley
Number of pages: 15
Grant note: RG-1440-061 / Deanship of Scientific Research at King Saud University; King Saud University
Identifiers: 9946589008331
Academic Unit: King Saud University
Language: English
Resource Type: Journal article