Year |
Citation |
Score |
2021 |
Gu J, Jung J. Adaptive Gaussian radial basis function methods for initial value problems: Construction and comparison with adaptive multiquadric radial basis function methods Journal of Computational and Applied Mathematics. 381: 113036. DOI: 10.1016/J.Cam.2020.113036 |
0.495 |
|
2020 |
Nicponski J, Jung J. Topological Data Analysis of Vascular Disease: A Theoretical Framework Frontiers in Applied Mathematics and Statistics. 6. DOI: 10.3389/Fams.2020.00034 |
0.316 |
|
2020 |
Duan H, Chen X, Jung J. On the consistency of the finite difference approximation with the Riemann-Liouville fractional derivative for 0 < α < 1 Applied Numerical Mathematics. 153: 35-51. DOI: 10.1016/J.Apnum.2020.01.020 |
0.486 |
|
2020 |
Gu J, Jung J. Adaptive Radial Basis Function Methods for Initial Value Problems Journal of Scientific Computing. 82: 47. DOI: 10.1007/S10915-020-01140-0 |
0.508 |
|
2019 |
Shi R, Jung JH, Schweser F. Two-dimensional local Fourier image reconstruction via domain decomposition Fourier continuation method. Plos One. 14: e0197963. PMID 30625147 DOI: 10.1371/journal.pone.0197963 |
0.315 |
|
2018 |
Nicponski J, Jung J. A Note on High-Precision Approximation of Asymptotically Decaying Solution and Orthogonal Decomposition Journal of Scientific Computing. 76: 189-215. DOI: 10.1007/S10915-017-0619-0 |
0.404 |
|
2018 |
Shi R, Jung J. A Domain Decomposition Fourier Continuation Method for Enhanced $$L_1$$ L 1 Regularization Using Sparsity of Edges in Reconstructing Fourier Data Journal of Scientific Computing. 74: 851-871. DOI: 10.1007/S10915-017-0467-Y |
0.413 |
|
2017 |
Guo J, Jung J. A numerical study of the local monotone polynomial edge detection for the hybrid WENO method Journal of Computational and Applied Mathematics. 321: 232-245. DOI: 10.1016/J.Cam.2017.02.029 |
0.475 |
|
2017 |
Guo J, Jung J. A RBF-WENO finite volume method for hyperbolic conservation laws with the monotone polynomial interpolation method Applied Numerical Mathematics. 112: 27-50. DOI: 10.1016/J.Apnum.2016.10.003 |
0.516 |
|
2017 |
Yang H, Guo J, Jung JH. Schwartz duality of the Dirac delta function for the Chebyshev collocation approximation to the fractional advection equation Applied Mathematics Letters. 64: 205-212. DOI: 10.1016/J.Aml.2016.09.009 |
0.448 |
|
2017 |
Guo J, Jung J. Radial Basis Function ENO and WENO Finite Difference Methods Based on the Optimization of Shape Parameters Journal of Scientific Computing. 70: 551-575. DOI: 10.1007/S10915-016-0257-Y |
0.488 |
|
2014 |
Wang D, Jung JH, Biondini G. Detailed comparison of numerical methods for the perturbed sine-Gordon equation with impulsive forcing Journal of Engineering Mathematics. 87: 167-186. DOI: 10.1007/S10665-013-9678-X |
0.487 |
|
2013 |
Jung JH, Lee J, Hoffmann KR, Dorazio T, Pitman EB. A rapid interpolation method of finding vascular CFD solutions with spectral collocation methods Journal of Computational Science. 4: 101-110. DOI: 10.1016/J.Jocs.2012.06.001 |
0.44 |
|
2013 |
Chakraborty D, Jung J. Efficient determination of the critical parameters and the statistical quantities for Klein–Gordon and sine-Gordon equations with a singular potential using generalized polynomial chaos methods Journal of Computational Science. 4: 46-61. DOI: 10.1016/J.Jocs.2012.04.002 |
0.421 |
|
2013 |
Chakraborty D, Jung J, Lorin E. An efficient determination of critical parameters of nonlinear Schrödinger equation with a point-like potential using generalized polynomial chaos methods Applied Numerical Mathematics. 72: 115-130. DOI: 10.1016/J.Apnum.2013.05.005 |
0.495 |
|
2013 |
Chakraborty D, Jung J. A quantitative study of the nonlinear Schrödinger equation with singular potential of any derivative orders Applied Mathematics Letters. 26: 860-866. DOI: 10.1016/J.Aml.2013.03.008 |
0.373 |
|
2012 |
Chen X, Jung J. Matrix Stability of Multiquadric Radial Basis Function Methods for Hyperbolic Equations with Uniform Centers Journal of Scientific Computing. 51: 683-702. DOI: 10.1007/S10915-011-9526-Y |
0.485 |
|
2011 |
Gottlieb S, Jung J, Kim S. A Review of David Gottlieb's Work on the Resolution of the Gibbs Phenomenon Communications in Computational Physics. 9: 497-519. DOI: 10.4208/Cicp.301109.170510S |
0.385 |
|
2011 |
Jung J, Song Y. On A Polynomial Chaos Method For Differential Equations With Singular Sources International Journal For Uncertainty Quantification. 1: 77-98. DOI: 10.1615/Int.J.Uncertaintyquantification.V1.I1.50 |
0.482 |
|
2011 |
Chakraborty D, Jung JH, Khanna G. A multi-domain hybrid method for head-on collision of black holes in particle limit International Journal of Modern Physics C. 22: 517-541. DOI: 10.1142/S0129183111016415 |
0.397 |
|
2011 |
Shin B, Jung J. Spectral collocation and radial basis function methods for one-dimensional interface problems Applied Numerical Mathematics. 61: 911-928. DOI: 10.1016/J.Apnum.2011.03.005 |
0.512 |
|
2011 |
Jung J, Gottlieb S, Kim SO. Iterative adaptive RBF methods for detection of edges in two-dimensional functions Applied Numerical Mathematics. 61: 77-91. DOI: 10.1016/J.Apnum.2010.08.006 |
0.466 |
|
2011 |
Jung J, Stefan W. A Simple Regularization of the Polynomial Interpolation for the Resolution of the Runge Phenomenon Journal of Scientific Computing. 46: 225-242. DOI: 10.1007/S10915-010-9397-7 |
0.417 |
|
2010 |
Jung J, Gottlieb S, Kim SO, Bresten CL, Higgs D. Recovery of High Order Accuracy in Radial Basis Function Approximations of Discontinuous Problems Journal of Scientific Computing. 45: 359-381. DOI: 10.1007/S10915-010-9360-7 |
0.512 |
|
2009 |
Jung J, Don WS. Collocation Methods for Hyperbolic Partial Differential Equations with Singular Sources Advances in Applied Mathematics and Mechanics. 1: 769-780. DOI: 10.4208/Aamm.09-M09S10 |
0.501 |
|
2009 |
Jung JH, Khanna G, Nagle I. A spectral collocation approximation for the radial-infall of a compact object into a schwarzschild black hole International Journal of Modern Physics C. 20: 1827-1848. DOI: 10.1142/S012918310901476X |
0.491 |
|
2009 |
Bresten CL, Jung J. A study on the numerical convergence of the discrete logistic map Communications in Nonlinear Science and Numerical Simulation. 14: 3076-3088. DOI: 10.1016/J.Cnsns.2008.11.009 |
0.312 |
|
2009 |
Jung J, Durante VR. An iterative adaptive multiquadric radial basis function method for the detection of local jump discontinuities Applied Numerical Mathematics. 59: 1449-1466. DOI: 10.1016/J.Apnum.2008.09.002 |
0.503 |
|
2009 |
Jung J. A Note on the Spectral Collocation Approximation of Some Differential Equations with Singular Source Terms Journal of Scientific Computing. 39: 49-66. DOI: 10.1007/S10915-008-9249-X |
0.397 |
|
2007 |
Jung JH, Shizgal BD. On the numerical convergence with the inverse polynomial reconstruction method for the resolution of the Gibbs phenomenon Journal of Computational Physics. 224: 477-488. DOI: 10.1016/J.Jcp.2007.01.018 |
0.455 |
|
2007 |
Jung J. A note on the Gibbs phenomenon with multiquadric radial basis functions Applied Numerical Mathematics. 57: 213-229. DOI: 10.1016/J.Apnum.2006.02.006 |
0.472 |
|
2006 |
Rosen J, Jung JH, Khanna G. Instabilities in numerical loop quantum cosmology Classical and Quantum Gravity. 23. DOI: 10.1088/0264-9381/23/23/028 |
0.336 |
|
2005 |
Jung JH, Shizgal BD. Inverse polynomial reconstruction of two dimensional Fourier images Journal of Scientific Computing. 25: 367-399. DOI: 10.1007/S10915-004-4795-3 |
0.433 |
|
2004 |
Jung JH, Shizgal BD. Generalization of the inverse polynomial reconstruction method in the resolution of the Gibbs phenomenon Journal of Computational and Applied Mathematics. 172: 131-151. DOI: 10.1016/J.Cam.2004.02.003 |
0.425 |
|
2003 |
Shizgal BD, Jung JH. Towards the resolution of the Gibbs phenomena Journal of Computational and Applied Mathematics. 161: 41-65. DOI: 10.1016/S0377-0427(03)00500-4 |
0.497 |
|
2003 |
Don W, Gottlieb D, Jung J. A multidomain spectral method for supersonic reactive flows Journal of Computational Physics. 192: 325-354. DOI: 10.1016/J.Jcp.2003.07.022 |
0.408 |
|
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