Fuzzy Boundary Element Method for Geometric Uncertainty in Elasticity Problem 2009-01-0567
Solutions to partial differential equations describing behavior of physical systems are often imprecise. This uncertainty is due to numerical approximations and uncertainty in physical parameters. In elastostatics, these parameters include uncertain material behavior, uncertain boundary conditions, and uncertain geometry of the system. This paper addresses the treatment of geometrical uncertainty for elasticity problems. The new method predicts fuzzy responses for the given membership functions, describing the range of tolerances for the system’s geometry. To obtain exact bounds on the solution to the resulting fuzzy linear system of equations, fuzzy matrix parameterization is developed. Numerical example is shown to illustrate the behavior of the method.
Citation: Zalewski, B., Mullen, R., and Muhanna, R., "Fuzzy Boundary Element Method for Geometric Uncertainty in Elasticity Problem," SAE Int. J. Mater. Manf. 2(1):310-316, 2009, https://doi.org/10.4271/2009-01-0567. Download Citation
Author(s):
Bart F. Zalewski, Robert L. Mullen, Rafi L. Muhanna
Affiliated:
Case Western Reserve University
Pages: 7
Event:
SAE World Congress & Exhibition
ISSN:
1946-3979
e-ISSN:
1946-3987
Also in:
SAE International Journal of Materials and Manufacturing-V118-5EJ, Reliability and Robust Design in Automotive Engineering, 2009-SP-2232, SAE International Journal of Materials and Manufacturing-V118-5
Related Topics:
Fuzzy logic
Mathematical analysis
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