Learning Adaptive Coarse Spaces of BDDC Algorithms for Stochastic Elliptic Problems with Oscillatory and High Contrast Coefficients

Chung, Eric and Kim, Hyea-Hyun and Lam, Ming-Fai and Zhao, Lina (2021) Learning Adaptive Coarse Spaces of BDDC Algorithms for Stochastic Elliptic Problems with Oscillatory and High Contrast Coefficients. Mathematical and Computational Applications, 26 (2). p. 44. ISSN 2297-8747

[thumbnail of mca-26-00044-v2.pdf] Text
mca-26-00044-v2.pdf - Published Version

Download (4MB)

Abstract

In this paper, we consider the balancing domain decomposition by constraints (BDDC) algorithm with adaptive coarse spaces for a class of stochastic elliptic problems. The key ingredient in the construction of the coarse space is the solutions of local spectral problems, which depend on the coefficient of the PDE. This poses a significant challenge for stochastic coefficients as it is computationally expensive to solve the local spectral problems for every realization of the coefficient. To tackle this computational burden, we propose a machine learning approach. Our method is based on the use of a deep neural network (DNN) to approximate the relation between the stochastic coefficients and the coarse spaces. For the input of the DNN, we apply the Karhunen–Loève expansion and use the first few dominant terms in the expansion. The output of the DNN is the resulting coarse space, which is then applied with the standard adaptive BDDC algorithm. We will present some numerical results with oscillatory and high contrast coefficients to show the efficiency and robustness of the proposed scheme.

Item Type: Article
Uncontrolled Keywords: BDDC; stochastic partial differential equation; artificial neural network; coarse space; high contrast
Subjects: SCI Archives > Mathematical Science
Depositing User: Managing Editor
Date Deposited: 10 Nov 2022 05:19
Last Modified: 09 Jul 2024 05:30
URI: http://science.classicopenlibrary.com/id/eprint/116

Actions (login required)

View Item
View Item