| Year |
Citation |
Score |
| 2020 |
Hoang T, Ju L, Leng W, Wang Z. High order explicit local time stepping methods for hyperbolic conservation laws Ieee Communications Magazine. 89: 1807-1842. DOI: 10.1090/Mcom/3507 |
0.344 |
|
| 2020 |
Gao H, Ju L, Li X, Duddu R. A space-time adaptive finite element method with exponential time integrator for the phase field model of pitting corrosion Journal of Computational Physics. 406: 109191. DOI: 10.1016/J.Jcp.2019.109191 |
0.469 |
|
| 2020 |
Gao H, Ju L, Duddu R, Li H. An efficient second-order linear scheme for the phase field model of corrosive dissolution Journal of Computational and Applied Mathematics. 367: 112472. DOI: 10.1016/J.Cam.2019.112472 |
0.438 |
|
| 2020 |
Tian H, Zhang J, Ju L. A spectral collocation method for nonlocal diffusion equations with volume constrained boundary conditions Applied Mathematics and Computation. 370: 124930. DOI: 10.1016/J.Amc.2019.124930 |
0.445 |
|
| 2020 |
Hoang T, Ju L, Wang Z. Nonoverlapping Localized Exponential Time Differencing Methods for Diffusion Problems Journal of Scientific Computing. 82: 1-27. DOI: 10.1007/S10915-020-01136-W |
0.436 |
|
| 2020 |
Li X, Ju L, Hoang T. Overlapping domain decomposition based exponential time differencing methods for semilinear parabolic equations Bit Numerical Mathematics. 1-36. DOI: 10.1007/S10543-020-00817-0 |
0.513 |
|
| 2019 |
Leng W, Ju L. An Additive Overlapping Domain Decomposition Method for the Helmholtz Equation Siam Journal On Scientific Computing. 41. DOI: 10.1137/18M1196170 |
0.363 |
|
| 2019 |
Du Q, Ju L, Li X, Qiao Z. Maximum Principle Preserving Exponential Time Differencing Schemes for the Nonlocal Allen--Cahn Equation Siam Journal On Numerical Analysis. 57: 875-898. DOI: 10.1137/18M118236X |
0.349 |
|
| 2019 |
Huang J, Ju L, Wu B. A fast compact time integrator method for a family of general order semilinear evolution equations Journal of Computational Physics. 393: 313-336. DOI: 10.1016/J.Jcp.2019.05.013 |
0.467 |
|
| 2019 |
Hoang T, Leng W, Ju L, Wang Z, Pieper K. Conservative explicit local time-stepping schemes for the shallow water equations Journal of Computational Physics. 382: 152-176. DOI: 10.1016/J.Jcp.2019.01.006 |
0.462 |
|
| 2019 |
Huang J, Ju L, Wu B. A fast compact exponential time differencing method for semilinear parabolic equations with Neumann boundary conditions Applied Mathematics Letters. 94: 257-265. DOI: 10.1016/J.Aml.2019.03.012 |
0.472 |
|
| 2019 |
Gao H, Ju L, Xie W. A Stabilized Semi-Implicit Euler Gauge-Invariant Method for the Time-Dependent Ginzburg–Landau Equations Journal of Scientific Computing. 80: 1083-1115. DOI: 10.1007/S10915-019-00968-5 |
0.501 |
|
| 2019 |
Du Q, Ju L, Lu J. Analysis of Fully Discrete Approximations for Dissipative Systems and Application to Time-Dependent Nonlocal Diffusion Problems Journal of Scientific Computing. 78: 1438-1466. DOI: 10.1007/S10915-018-0815-6 |
0.435 |
|
| 2018 |
Hoang T, Ju L, Wang Z. Overlapping localized exponential time differencing methods for diffusion problems Communications in Mathematical Sciences. 16: 1531-1555. DOI: 10.4310/Cms.2018.V16.N6.A3 |
0.324 |
|
| 2018 |
Yang H, Gunzburger MD, Ju L. Fast spherical centroidal Voronoi mesh generation: A Lloyd-preconditioned LBFGS method in parallel Journal of Computational Physics. 367: 235-252. DOI: 10.1016/J.Jcp.2018.04.034 |
0.611 |
|
| 2018 |
Li S, Luo L, Wang ZJ, Ju L. An exponential time-integrator scheme for steady and unsteady inviscid flows Journal of Computational Physics. 365: 206-225. DOI: 10.1016/J.Jcp.2018.03.020 |
0.426 |
|
| 2018 |
Du Q, Ju L, Li X, Qiao Z. Stabilized linear semi-implicit schemes for the nonlocal Cahn-Hilliard equation Journal of Computational Physics. 363: 39-54. DOI: 10.1016/J.Jcp.2018.02.023 |
0.461 |
|
| 2017 |
Ju L, Wang Z. Exponential Time Differencing Gauge Method for Incompressible Viscous Flows Communications in Computational Physics. 22: 517-541. DOI: 10.4208/Cicp.Oa-2016-0234 |
0.476 |
|
| 2017 |
Ju L, Leng W, Wang Z, Yuan S. Numerical investigation of ensemble methods with block iterative solvers for evolution problems Discrete and Continuous Dynamical Systems-Series B. 22: 0-0. DOI: 10.3934/Dcdsb.2020132 |
0.422 |
|
| 2017 |
Du Q, Ju L, Lu J. A discontinuous Galerkin method for one-dimensional time-dependent nonlocal diffusion problems Ieee Communications Magazine. 88: 123-147. DOI: 10.1090/Mcom/3333 |
0.358 |
|
| 2017 |
Tian H, Ju L, Du Q. A conservative nonlocal convection–diffusion model and asymptotically compatible finite difference discretization Computer Methods in Applied Mechanics and Engineering. 320: 46-67. DOI: 10.1016/J.Cma.2017.03.020 |
0.49 |
|
| 2017 |
Yang X, Ju L. Linear and unconditionally energy stable schemes for the binary fluid–surfactant phase field model Computer Methods in Applied Mechanics and Engineering. 318: 1005-1029. DOI: 10.1016/J.Cma.2017.02.011 |
0.402 |
|
| 2017 |
Yang X, Ju L. Efficient linear schemes with unconditional energy stability for the phase field elastic bending energy model Computer Methods in Applied Mechanics and Engineering. 315: 691-712. DOI: 10.1016/J.Cma.2016.10.041 |
0.393 |
|
| 2017 |
Duo S, Ju L, Zhang Y. A Fast Algorithm for Solving the Space-Time Fractional Diffusion Equation Computers & Mathematics With Applications. 75: 1929-1941. DOI: 10.1016/J.Camwa.2017.04.008 |
0.476 |
|
| 2017 |
Zhang X, Wu J, Ju L. An accurate and asymptotically compatible collocation scheme for nonlocal diffusion problems Applied Numerical Mathematics. 133: 52-68. DOI: 10.1016/J.Apnum.2017.11.007 |
0.446 |
|
| 2017 |
Li H, Ju L, Zhang C, Peng Q. Unconditionally Energy Stable Linear Schemes for the Diffuse Interface Model with Peng–Robinson Equation of State Journal of Scientific Computing. 75: 993-1015. DOI: 10.1007/S10915-017-0576-7 |
0.444 |
|
| 2016 |
Zhao W, Zhang W, Ju L. A Multistep Scheme for Decoupled Forward-Backward Stochastic Differential Equations Numerical Mathematics. 9: 262-288. DOI: 10.4208/Nmtma.2016.M1421 |
0.424 |
|
| 2016 |
Wang X, Ju L, Du Q. Efficient and stable exponential time differencing Runge-Kutta methods for phase field elastic bending energy models Journal of Computational Physics. 316: 21-38. DOI: 10.1016/J.Jcp.2016.04.004 |
0.415 |
|
| 2016 |
Zhang X, Gunzburger M, Ju L. Quadrature rules for finite element approximations of 1D nonlocal problems Journal of Computational Physics. 310: 213-236. DOI: 10.1016/J.Jcp.2016.01.016 |
0.612 |
|
| 2016 |
Zhang X, Gunzburger M, Ju L. Nodal-type collocation methods for hypersingular integral equations and nonlocal diffusion problems Computer Methods in Applied Mechanics and Engineering. 299: 401-420. DOI: 10.1016/J.Cma.2015.11.008 |
0.62 |
|
| 2015 |
Zhou Y, Ju L, Wang S. Multiscale Superpixels and Supervoxels Based on Hierarchical Edge-Weighted Centroidal Voronoi Tessellation. Ieee Transactions On Image Processing : a Publication of the Ieee Signal Processing Society. PMID 26111396 DOI: 10.1109/Tip.2015.2449552 |
0.322 |
|
| 2015 |
Zhang T, Ju L, Leng W, Price S, Gunzburger M. Thermomechanically coupled modelling for land-terminating glaciers: A comparison of two-dimensional, first-order and three-dimensional, full-Stokes approaches Journal of Glaciology. 61: 702-712. DOI: 10.3189/2015Jog14J220 |
0.525 |
|
| 2015 |
Ju L, Zhang J, Du Q. Fast and accurate algorithms for simulating coarsening dynamics of Cahn-Hilliard equations Computational Materials Science. 108: 272-282. DOI: 10.1016/J.Commatsci.2015.04.046 |
0.468 |
|
| 2015 |
Tian H, Ju L, Du Q. Nonlocal convection-diffusion problems and finite element approximations Computer Methods in Applied Mechanics and Engineering. 289: 60-78. DOI: 10.1016/J.Cma.2015.02.008 |
0.432 |
|
| 2015 |
Zhu L, Ju L, Zhao W. Fast High-Order Compact Exponential Time Differencing Runge–Kutta Methods for Second-Order Semilinear Parabolic Equations Journal of Scientific Computing. DOI: 10.1007/S10915-015-0117-1 |
0.465 |
|
| 2015 |
Ju L, Zhang J, Zhu L, Du Q. Fast Explicit Integration Factor Methods for Semilinear Parabolic Equations Journal of Scientific Computing. 62: 431-455. DOI: 10.1007/S10915-014-9862-9 |
0.472 |
|
| 2014 |
Leng W, Ju L, Gunzburger M, Price S. A Parallel Computational Model for Three-Dimensional, Thermo-Mechanical Stokes Flow Simulations of Glaciers and Ice Sheets Communications in Computational Physics. 16: 1056-1080. DOI: 10.4208/Cicp.310813.010414A |
0.529 |
|
| 2014 |
Zhao W, Zhang W, Ju L. A numerical method and its error estimates for the decoupled forward-backward stochastic differential equations Communications in Computational Physics. 15: 618-646. DOI: 10.4208/Cicp.280113.190813A |
0.442 |
|
| 2014 |
Ju L, Liu X, Leng W. Compact implicit integration factor methods for a family of semilinear fourth-order parabolic equations Discrete and Continuous Dynamical Systems - Series B. 19: 1667-1687. DOI: 10.3934/Dcdsb.2014.19.1667 |
0.446 |
|
| 2014 |
Leng W, Ju L, Xie Y, Cui T, Gunzburger M. Finite element three-dimensional Stokes ice sheet dynamics model with enhanced local mass conservation Journal of Computational Physics. 274: 299-311. DOI: 10.1016/J.Jcp.2014.06.014 |
0.582 |
|
| 2013 |
Leng W, Ju L, Gunzburger M, Price S. Manufactured solutions and the verification of three-dimensional Stokes ice-sheet models The Cryosphere. 7: 19-29. DOI: 10.5194/Tc-7-19-2013 |
0.574 |
|
| 2012 |
Leng W, Ju L, Gunzburger M, Price S, Ringler T. A parallel high‐order accurate finite element nonlinear Stokes ice sheet model and benchmark experiments Journal of Geophysical Research. 117. DOI: 10.1029/2011Jf001962 |
0.59 |
|
| 2012 |
Ju L, Tian L, Xiao X, Zhao W. Covolume-upwind finite volume approximations for linear elliptic partial differential equations Journal of Computational Physics. 231: 6097-6120. DOI: 10.1016/J.Jcp.2012.05.004 |
0.502 |
|
| 2012 |
Wang Y, Ju L, Wang D, Wang X. Generalized edge-weighted centroidal Voronoi tessellations for geometry processing Computers & Mathematics With Applications. 64: 2663-2681. DOI: 10.1016/J.Camwa.2012.07.011 |
0.389 |
|
| 2011 |
Wang J, Ju L, Wang X. Image segmentation using local variation and edge-weighted centroidal Voronoi tessellations. Ieee Transactions On Image Processing : a Publication of the Ieee Signal Processing Society. 20: 3242-56. PMID 21550885 DOI: 10.1109/Tip.2011.2150237 |
0.319 |
|
| 2011 |
Zhang H, Ju L. Coupled Models and Parallel Simulations for Three-Dimensional Full-Stokes Ice Sheet Modeling Numerical Mathematics-Theory Methods and Applications. 4: 396-418. DOI: 10.4208/Nmtma.2011.M1031 |
0.462 |
|
| 2011 |
Ringler TD, Jacobsen D, Gunzburger M, Ju L, Duda M, Skamarock W. Exploring a Multiresolution Modeling Approach within the Shallow-Water Equations Monthly Weather Review. 139: 3348-3368. DOI: 10.1175/Mwr-D-10-05049.1 |
0.578 |
|
| 2011 |
Du Q, Ju L, Tian L. Finite element approximation of the Cahn–Hilliard equation on surfaces Computer Methods in Applied Mechanics and Engineering. 200: 2458-2470. DOI: 10.1016/J.Cma.2011.04.018 |
0.485 |
|
| 2010 |
Zhao W, Zhang G, Ju L. A Stable Multistep Scheme for Solving Backward Stochastic Differential Equations Siam Journal On Numerical Analysis. 48: 1369-1394. DOI: 10.1137/09076979X |
0.444 |
|
| 2010 |
Zhu L, Wang Y, Ju L, Wang D. A variational phase field method for curve smoothing Journal of Computational Physics. 229: 2390-2400. DOI: 10.1016/J.Jcp.2009.11.040 |
0.446 |
|
| 2010 |
Choate EP, Forest MG, Ju L. Effects of strong anchoring on the dynamic moduli of heterogeneous nematic polymers II: Oblique anchoring angles Rheologica Acta. 49: 335-347. DOI: 10.1007/S00397-009-0397-1 |
0.312 |
|
| 2009 |
Wang J, Ju L, Wang X. An edge-weighted centroidal Voronoi tessellation model for image segmentation. Ieee Transactions On Image Processing : a Publication of the Ieee Signal Processing Society. 18: 1844-58. PMID 19556200 DOI: 10.1109/Tip.2009.2021087 |
0.34 |
|
| 2009 |
Ju L, Wu W, Zhao W. Adaptive finite volume methods for steady convection-diffusion equations with mesh optimization Discrete and Continuous Dynamical Systems-Series B. 11: 669-690. DOI: 10.3934/Dcdsb.2009.11.669 |
0.463 |
|
| 2009 |
Ju L, Du Q. A finite volume method on general surfaces and its error estimates Journal of Mathematical Analysis and Applications. 352: 645-668. DOI: 10.1016/J.Jmaa.2008.11.022 |
0.427 |
|
| 2009 |
Nguyen H, Burkardt J, Gunzburger M, Ju L, Saka Y. Constrained CVT meshes and a comparison of triangular mesh generators Computational Geometry: Theory and Applications. 42: 1-19. DOI: 10.1016/J.Comgeo.2008.04.002 |
0.613 |
|
| 2009 |
Nguyen H, Gunzburger M, Ju L, Burkardt J. Adaptive Anisotropic Meshing For Steady Convection-Dominated Problems Computer Methods in Applied Mechanics and Engineering. 198: 2964-2981. DOI: 10.1016/J.Cma.2009.05.001 |
0.602 |
|
| 2009 |
Ju L, Tian L, Wang D. A posteriori error estimates for finite volume approximations of elliptic equations on general surfaces Computer Methods in Applied Mechanics and Engineering. 198: 716-726. DOI: 10.1016/J.Cma.2008.10.007 |
0.366 |
|
| 2008 |
Emelianenko M, Ju L, Rand A. Nondegeneracy and weak global convergence of the Lloyd algorithm in ℝD Siam Journal On Numerical Analysis. 46: 1423-1441. DOI: 10.1137/070691334 |
0.382 |
|
| 2008 |
Du Q, Ju L, Tian L. Analysis of a mixed finite-volume discretization of fourth-order equations on general surfaces Ima Journal of Numerical Analysis. 29: 376-403. DOI: 10.1093/Imanum/Drn021 |
0.47 |
|
| 2008 |
Ringler T, Ju L, Gunzburger M. A multiresolution method for climate system modeling: application of spherical centroidal Voronoi tessellations Ocean Dynamics. 58: 475-498. DOI: 10.1007/S10236-008-0157-2 |
0.525 |
|
| 2008 |
Ju L, Lee HC, Tian L. Numerical simulations of the steady Navier-Stokes equations using adaptive meshing schemes International Journal For Numerical Methods in Fluids. 56: 703-721. DOI: 10.1002/Fld.1549 |
0.494 |
|
| 2006 |
Ju L, Gunzburger M, Zhao W. Adaptive Finite Element Methods for Elliptic PDEs Based on Conforming Centroidal Voronoi-Delaunay Triangulations Siam Journal On Scientific Computing. 28: 2023-2053. DOI: 10.1137/050643568 |
0.603 |
|
| 2006 |
Du Q, Emelianenko M, Ju L. Convergence of the Lloyd algorithm for computing centroidal voronoi tessellations Siam Journal On Numerical Analysis. 44: 102-119. DOI: 10.1137/040617364 |
0.401 |
|
| 2006 |
Gunzburger M, Hou LS, Ju L. A numerical method for exact boundary controllability problems for the wave equation Computers & Mathematics With Applications. 51: 721-750. DOI: 10.1016/J.Camwa.2006.03.003 |
0.598 |
|
| 2006 |
Du Q, Gunzburger M, Ju L, Wang X. Centroidal Voronoi Tessellation Algorithms for Image Compression, Segmentation, and Multichannel Restoration Journal of Mathematical Imaging and Vision. 24: 177-194. DOI: 10.1007/S10851-005-3620-4 |
0.489 |
|
| 2005 |
Ju L, Hurdal MK, Stern J, Rehm K, Schaper K, Rottenberg D. Quantitative evaluation of three cortical surface flattening methods. Neuroimage. 28: 869-80. PMID 16112878 DOI: 10.1016/J.Neuroimage.2005.06.055 |
0.305 |
|
| 2005 |
Du Q, Ju L. Finite volume methods on spheres and spherical centroidal Voronoi meshes Siam Journal On Numerical Analysis. 43: 1673-1692. DOI: 10.1137/S0036142903425410 |
0.486 |
|
| 2005 |
Du Q, Ju L. Approximations of a Ginzburg-Landau model for superconducting hollow spheres based on spherical centroidal Voronoi tessellations Mathematics of Computation. 74: 1257-1280. DOI: 10.1090/S0025-5718-04-01719-3 |
0.453 |
|
| 2004 |
Du Q, Ju L. Numerical simulations of the quantized vortices on a thin superconducting hollow sphere Journal of Computational Physics. 201: 511-530. DOI: 10.1016/J.Jcp.2004.06.009 |
0.408 |
|
| 2003 |
Du Q, Gunzburger MD, Ju L. Constrained centroidal Voronoi tessellations for surfaces Siam Journal On Scientific Computing. 24: 1488-1506. DOI: 10.1137/S1064827501391576 |
0.563 |
|
| 2003 |
Du Q, Gunzburger MD, Ju L. Voronoi-based finite volume methods, optimal Voronoi meshes, and PDEs on the sphere Computer Methods in Applied Mechanics and Engineering. 192: 3933-3957. DOI: 10.1016/S0045-7825(03)00394-3 |
0.642 |
|
| 2002 |
Du Q, Gunzburger M, Ju L. Meshfree, probabilistic determination of point sets and support regions for meshless computing Computer Methods in Applied Mechanics and Engineering. 191: 1349-1366. DOI: 10.1016/S0045-7825(01)00327-9 |
0.539 |
|
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