FFT-Based Methods for Solving a Rough Adhesive Contact: Description and Convergence Study

The contact problem of a semi-infinite elastic body with a rigid rough surface with adhesive forces is modeled using a boundary element method (BEM). An original theoretical framework for this problem is presented. Four original BEM algorithms are studied, for both prescribed normal pressure and pre...

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Bibliographic Details
Published in:Tribology letters 2018-03, Vol.66 (1), p.1-12, Article 29
Main Authors: Bugnicourt, R., Sainsot, P., Dureisseix, D., Gauthier, C., Lubrecht, A. A.
Format: Article
Language:English
Subjects:
Algorithms
Boundary element method
Chemistry and Materials Science
Conjugates
Corrosion and Coatings
Elastic bodies
Engineering Sciences
Fast Fourier transformations
Fourier transforms
Iterative methods
Linearization
Materials and structures in mechanics
Materials Science
Matrix algebra
Matrix methods
Mechanics
Nanotechnology
Original Paper
Physical Chemistry
Physics
Special Issue: The Contact-Mechanics Challenge
Structural mechanics
Surfaces and Interfaces
Theoretical and Applied Mechanics
Thin Films
Tribology
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Summary:The contact problem of a semi-infinite elastic body with a rigid rough surface with adhesive forces is modeled using a boundary element method (BEM). An original theoretical framework for this problem is presented. Four original BEM algorithms are studied, for both prescribed normal pressure and prescribed penetration, in primal and dual forms. They are all based on a conjugate gradient iterative solver. For each case, the solver is finely tuned to tackle the current problem. Using fast Fourier transforms (FFT) speeds up the computation of the matrix–vector multiplications. A new way of computing the coefficients of the conjugate gradient solver which reduces the number of FFTs at each step is presented. The stability and efficiency of the different methods are compared, showing a great sensitivity to the Tabor coefficient and to the contact area ratio. The most stable algorithm proved to be reliable for very large-scale computations through a participation to M. Mueser’s Contact Mechanics Challenge .
ISSN:1023-8883
1573-2711
DOI:10.1007/s11249-017-0980-z