The following publications are possibly variants of this publication:
- Generalized Multiscale Finite-Element Method (GMsFEM) for elastic wave propagation in heterogeneous, anisotropic mediaKai Gao, Shubin Fu, Richard L. Gibson Jr., Eric T. Chung, Yalchin Efendiev. jcphy, 295:161-188, 2015. [doi]
- Generalized Multiscale Finite Element Method for Elastic Wave Propagation in the Frequency DomainUygulana Gavrilieva, Maria Vasilyeva, Eric T. Chung. computation, 8(3):63, 2020. [doi]
- Generalized Multiscale Finite Element Method for scattering problem in heterogeneous mediaUygulaana Kalachikova, Maria V. Vasilyeva, Isaac Harris, Eric T. Chung. jcam, 424:114977, May 2023. [doi]
- Generalized Multiscale Finite Element Method for thermoporoelasticity problems in heterogeneous and fractured mediaDmitry Ammosov, Maria V. Vasilyeva, Eric T. Chung. jcam, 407:113995, 2022. [doi]
- An Energy-Conserving Discontinuous Multiscale Finite Element Method for the wave equation in Heterogeneous MediaEric T. Chung, Yalchin Efendiev, Richard L. Gibson Jr.. aada, 3(1-2):251-268, 2011. [doi]
- Explicit and Energy-Conserving Constraint Energy Minimizing Generalized Multiscale Discontinuous Galerkin Method for Wave Propagation in Heterogeneous MediaSiu Wun Cheung, Eric T. Chung, Yalchin Efendiev, Wing Tat Leung. mmas, 19(4):1736-1759, 2021. [doi]
- Generalized Multiscale Finite Element Method for the poroelasticity problem in multicontinuum mediaAleksei Tyrylgin, Maria V. Vasilyeva, Denis Spiridonov, Eric T. Chung. jcam, 374:112783, 2020. [doi]