74Q15 Effective constitutive equations
Refine
Year of publication
- 2021 (1)
Document Type
- Doctoral Thesis (1)
Language
- English (1)
Has Fulltext
- yes (1)
Keywords
Faculty / Organisational entity
In this thesis one considers the periodic homogenization of a linearly coupled magneto-elastic model problem and focuses on the derivation of spectral methods to solve the obtained unit cell problem afterwards. In the beginning, the equations of linear elasticity and magnetism are presented together with the physical quantities used within. After specifying the model assumptions, the system of partial differential equations is rewritten in a weak form for which the existence and uniqueness of solutions is discussed. The model problem then undergoes a homogenization process where the original problem is approximated by a substitute problem with a repeating micro-structural geometry that was generated from a representative volume element (RVE). The following separation of scales, which can be achieved either by an asymptotic expansion or through a two-scale limit process, yields the homogenized problem on the macroscopic scale and the periodic unit cell problem. The latter is further analyzed using Fourier series, leading to periodic Lippmann-Schwinger type equations allowing for the development of matrix-free solvers. It is shown that, while it is possible to craft a scheme for the coupled problem from the purely elastic and magnetic Lippmann-Schwinger equations alone without much additional effort, a more general setting is provided when deriving a Lippmann-Schwinger equation for the coupled system directly. These numerical approaches are then validated with some analytically solvable test problems, before their performance is tested against each other for some more complex examples.