Manifold Learning and Nonlinear Homogenization
Publication
, Journal Article
Chen, S; Li, Q; Lu, J; Wright, SJ
November 1, 2020
We describe an efficient domain decomposition-based framework for nonlinear multiscale PDE problems. The framework is inspired by manifold learning techniques and exploits the tangent spaces spanned by the nearest neighbors to compress local solution manifolds. Our framework is applied to a semilinear elliptic equation with oscillatory media and a nonlinear radiative transfer equation; in both cases, significant improvements in efficacy are observed. This new method does not rely on detailed analytical understanding of the multiscale PDEs, such as their asymptotic limits, and thus is more versatile for general multiscale problems.
Duke Scholars
Publication Date
November 1, 2020
Citation
APA
Chicago
ICMJE
MLA
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Chen, S., Li, Q., Lu, J., & Wright, S. J. (2020). Manifold Learning and Nonlinear Homogenization.
Chen, Shi, Qin Li, Jianfeng Lu, and Stephen J. Wright. “Manifold Learning and Nonlinear Homogenization,” November 1, 2020.
Chen S, Li Q, Lu J, Wright SJ. Manifold Learning and Nonlinear Homogenization. 2020 Nov 1;
Chen, Shi, et al. Manifold Learning and Nonlinear Homogenization. Nov. 2020.
Chen S, Li Q, Lu J, Wright SJ. Manifold Learning and Nonlinear Homogenization. 2020 Nov 1;
Publication Date
November 1, 2020