Additive Schwarz Methods for Convex Optimization as Gradient Methods J Park
SIAM Journal on Numerical Analysis 58 (3), 1495-1530, 2020
19 2020 A Finite Element Approach for the Dual Rudin--Osher--Fatemi Model and Its Nonoverlapping Domain Decomposition Methods CO Lee, EH Park, J Park
SIAM Journal on Scientific Computing 41 (2), B205-B228, 2019
18 2019 Domain Decomposition Methods Using Dual Conversion for the Total Variation Minimization with Fidelity Term CO Lee, C Nam, J Park
Journal of Scientific Computing 78 (2), 951-970, 2019
14 2019 Fast Nonoverlapping Block Jacobi Method for the Dual Rudin--Osher--Fatemi Model CO Lee, J Park
SIAM Journal on Imaging Sciences 12 (4), 2009-2034, 2019
13 2019 Accelerated Additive Schwarz Methods for Convex Optimization with Adaptive Restart J Park
Journal of Scientific Computing 89 (3), 1-20, 2021
8 2021 A variational framework for the strain-smoothed element method C Lee, J Park
Computers & Mathematics with Applications 94, 76-93, 2021
8 2021 A Finite Element Nonoverlapping Domain Decomposition Method with Lagrange Multipliers for the Dual Total Variation Minimizations CO Lee, J Park
Journal of Scientific Computing 81 (3), 2331-2355, 2019
8 2019 An Optimized Dynamic Mode Decomposition Model Robust to Multiplicative Noise M Lee, J Park
SIAM Journal on Applied Dynamical Systems 22 (1), 235-268, 2023
7 2023 A dual-primal finite element tearing and interconnecting method for nonlinear variational inequalities utilizing linear local problems CO Lee, J Park
International Journal for Numerical Methods in Engineering 122 (22), 6455-6475, 2021
7 2021 Additive Schwarz methods for convex optimization with backtracking J Park
Computers & Mathematics with Applications 113, 332-344, 2022
6 2022 Two-level group convolution Y Lee, J Park, CO Lee
Neural Networks 154, 323-332, 2022
5 2022 Pseudo-linear Convergence of an Additive Schwarz Method for Dual Total Variation Minimization J Park
Electronic Transactions on Numerical Analysis 54, 176-197, 2021
5 2021 Recent Advances in Domain Decomposition Methods for Total Variation Minimization CO Lee, J Park
Journal of the Korean Society for Industrial and Applied Mathematics 24 (2 …, 2020
5 2020 An Overlapping Domain Decomposition Framework without Dual Formulation for Variational Imaging Problems J Park
Advances in Computational Mathematics 46, 57, 2020
5 2020 A numerically efficient output-only system-identification framework for stochastically forced self-sustained oscillators M Lee, KT Kim, J Park
Probabilistic Engineering Mechanics 74, 103516, 2023
4 2023 Preconditioning for finite element methods with strain smoothing C Lee, J Park
Computers & Mathematics with Applications 130, 41-57, 2023
4 2023 On the linear convergence of additive Schwarz methods for the -Laplacian YJ Lee, J Park
arXiv preprint arXiv:2210.09183, 2022
4 * 2022 Parareal Neural Networks Emulating a Parallel-in-Time Algorithm Y Lee, J Park, CO Lee
IEEE Transactions on Neural Networks and Learning Systems 35 (5), 6353-6364, 2022
3 2022 A gradient smoothing method and its multiscale variant for flows in heterogeneous porous media C Lee, M Moon, J Park
Computer Methods in Applied Mechanics and Engineering 395, 115039, 2022
3 2022 Additive Schwarz methods for fourth-order variational inequalities J Park
arXiv preprint arXiv:2301.07260, 2023
2 2023