| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 511420 | Computers & Structures | 2012 | 10 Pages |
A complex system can be modeled using various fidelities with the finite element method. A high-fidelity model is expected to be more computationally expensive compared to a low-fidelity model and in general may contain more degrees of freedom and more elements. This paper proposes a novel multi-fidelity approach to solve boundary value problems using the finite element method. A Bayesian approach based on Gaussian process emulators in conjunction with the domain decomposition method is developed. Using this approach one can seamlessly assimilate a low-fidelity model with a more expensive high-fidelity model. The idea is illustrated using elliptic boundary value problems.
► We propose a method to assimilate low-fidelity FE models with high-fidelity models. ► We couple Gaussian process emulators with domain decomposition methods. ► The computational cost of the associated Schur complement problem is reduced. ► The method is discussed and tested with different geometries.
