Articles with public access mandates - Lin MuLearn more
Not available anywhere: 4
A new weak Galerkin finite element scheme for the Brinkman model
Q Zhai, R Zhang, L Mu
Communications in Computational Physics 19 (5), 1409-1434, 2016
Mandates: US National Science Foundation, National Natural Science Foundation of China
A pressure-robust virtual element method for the Stokes problem
G Wang, L Mu, Y Wang, Y He
Computer Methods in Applied Mechanics and Engineering 382, 113879, 2021
Mandates: National Natural Science Foundation of China
Development of pressure-robust discontinuous Galerkin finite element methods for the Stokes problem
L Mu, X Ye, S Zhang
Journal of Scientific Computing 89 (1), 26, 2021
Mandates: US National Science Foundation
A posteriori error estimates of stabilized finite volume method for the Stokes equations
T Zhang, L Mu, JY Yuan
Mathematical Methods in the Applied Sciences 39 (1), 32-43, 2016
Mandates: National Natural Science Foundation of China
Available somewhere: 41
Representability of algebraic topology for biomolecules in machine learning based scoring and virtual screening
Z Cang, L Mu, GW Wei
PLoS computational biology 14 (1), e1005929, 2018
Mandates: US National Science Foundation, US Department of Energy
Weak Galerkin methods for second order elliptic interface problems
L Mu, J Wang, G Wei, X Ye, S Zhao
Journal of computational physics 250, 106-125, 2013
Mandates: US National Institutes of Health
A topological approach for protein classification
Z Cang, L Mu, K Wu, K Opron, K Xia, GW Wei
Computational and Mathematical Biophysics 3 (1), 2015
Mandates: US Department of Energy, US National Institutes of Health
A new weak Galerkin finite element method for elliptic interface problems
L Mu, J Wang, X Ye, S Zhao
Journal of Computational Physics 325, 157-173, 2016
Mandates: US National Science Foundation, US Department of Energy
Weak Galerkin finite element methods for Darcy flow: Anisotropy and heterogeneity
G Lin, J Liu, L Mu, X Ye
Journal of computational physics 276, 422-437, 2014
Mandates: US Department of Energy
A weak Galerkin finite element method for the Navier–Stokes equations
X Hu, L Mu, X Ye
Journal of Computational and Applied Mathematics 362, 614-625, 2019
Mandates: US National Science Foundation, US Department of Energy
A stabilizer-free, pressure-robust, and superconvergence weak Galerkin finite element method for the Stokes equations on polytopal mesh
L Mu, X Ye, S Zhang
SIAM Journal on Scientific Computing 43 (4), A2614-A2637, 2021
Mandates: US National Science Foundation
A mesh-free method using piecewise deep neural network for elliptic interface problems
C He, X Hu, L Mu
Journal of Computational and Applied Mathematics 412, 114358, 2022
Mandates: US National Science Foundation
Multiscale persistent functions for biomolecular structure characterization
K Xia, Z Li, L Mu
Bulletin of mathematical biology 80, 1-31, 2018
Mandates: US Department of Energy
Weak Galerkin method for the Biot’s consolidation model
X Hu, L Mu, X Ye
Computers & Mathematics with Applications 75 (6), 2017-2030, 2018
Mandates: US National Science Foundation, US Department of Energy
A hybridized formulation for the weak Galerkin mixed finite element method
L Mu, J Wang, X Ye
Journal of Computational and Applied Mathematics 307, 335-345, 2016
Mandates: US National Science Foundation, US Department of Energy
A least-squares-based weak Galerkin finite element method for second order elliptic equations
L Mu, J Wang, X Ye
SIAM Journal on Scientific Computing 39 (4), A1531-A1557, 2017
Mandates: US National Science Foundation, US Department of Energy
A posteriori error estimates for the weak Galerkin finite element methods on polytopal meshes
H Li
Communications in Computational Physics 26 (2), 2019
Mandates: US National Science Foundation, US Department of Energy, National Natural …
A discrete divergence free weak Galerkin finite element method for the Stokes equations
L Mu, J Wang, X Ye, S Zhang
Applied Numerical Mathematics 125, 172-182, 2018
Mandates: US National Science Foundation, US Department of Energy
Interior energy error estimates for the weak Galerkin finite element method
H Li, L Mu, X Ye
Numerische Mathematik 139 (2), 447-478, 2018
Mandates: US National Science Foundation, US Department of Energy, National Natural …
A simple finite element method for the Stokes equations
L Mu, X Ye
Advances in Computational Mathematics 43, 1305-1324, 2017
Mandates: US National Science Foundation, US Department of Energy
Publication and funding information is determined automatically by a computer program