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Professor Dr T.E. Simos ‐ CV 6. Loukopoulos, VC (Loukopoulos, V. C.)[ 1 ] ; Bourantas, GC (Bourantas, G. C.)[ 2 ], Solution of Two‐dimensional Linear and Nonlinear Unsteady Schrodinger Equation using "Quantum Hydrodynamics" Formulation with a MLPG Collocation Method, CMES‐COMPUTER MODELING IN ENGINEERING & SCIENCES, Volume: 103 Issue: 1 Pages: 49‐70, Published: DEC 2014 7. Yang, YP (Yang, Yanping)[ 1 ] ; Wu, K (Wu, Ke)[ 1 ] ; Fang, YL (Fang, Yonglei)[ 1 ], Exponentially fitted TDRK pairs for the Schrodinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY, Volume: 53 Issue: 6 Pages: 1470‐1487, DOI: 10.1007/s10910‐015‐0500‐z, Published: JUN 2015 Paper [P249] 1. Z.A. Anastassi, A new symmetric linear eight‐step method with fifth trigonometric order for the efficient integration of the Schrodinger equation, APPLIED MATHEMATICS LETTERS Volume: 24 Issue: 8 Pages: 1468‐1472, AUG 2011 2. A. Konguetsof, A hybrid method with phase‐lag and derivatives equal to zero for the numerical integration of the Schrödinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 49 Issue: 7 Pages: 1330‐1356 DOI: 10.1007/s10910‐011‐9824‐5 Published: AUG 2011 Paper [P250] 1. A. Konguetsof, A hybrid method with phase‐lag and derivatives equal to zero for the numerical integration of the Schrödinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 49 Issue: 7 Pages: 1330‐1356 DOI: 10.1007/s10910‐011‐9824‐5 Published: AUG 2011 2. Fang, YL (Fang, Yonglei)[ 1 ] ; You, X (You, Xiong)[ 2,3 ] ; Ming, QH (Ming, Qinghe)[ 1 ], New optimized explicit modified RKN methods for the numerical solution of the Schrodinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 51 Issue: 1 Pages: 390‐411 DOI: 10.1007/s10910‐012‐0090‐y Published: JAN 2013 Paper [P251] 1. D. Conte, E. Esposito, B. Paternoster, L.G. Ixaru, Some new uses of the eta(m)(Z) functions, Computer Physics Communications 181(1), 128‐ 137(2010) 2. H.J. Zhu, S.H. Song and Y.F. Tang, Multi‐symplectic wavelet collocation method for the nonlinear Schrodinger equation and the Camassa‐Holm equation, COMPUTER PHYSICS COMMUNICATIONS Volume: 182 Issue: 3 Pages: 616‐627, MAR 2011 Page 225 of 379
Professor Dr T.E. Simos ‐ CV 3. A. Konguetsof, A hybrid method with phase‐lag and derivatives equal to zero for the numerical integration of the Schrödinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 49 Issue: 7 Pages: 1330‐1356 DOI: 10.1007/s10910‐011‐9824‐5 Published: AUG 2011 4. Cieslinski Jan L. ; Ratkiewicz Boguslaw, Discrete gradient algorithms of high order for one‐dimensional systems, COMPUTER PHYSICS COMMUNICATIONS Volume: 183 Issue: 3 Pages: 617‐627 DOI: 10.1016/j.cpc.2011.12.008 Published: MAR 2012 5. L. Brugnano, F. Iavernaro and D. Trigiante, A two‐step, fourth‐order method with energy preserving properties, COMPUTER PHYSICS COMMUNICATIONS Volume: 183 Issue: 9 Pages: 1860‐1868 DOI: 10.1016/j.cpc.2012.04.002 Published: SEP 2012 6. W. Shi, X.Y. Wu and J.L. Xia, Explicit multi‐symplectic extended leap‐frog methods for Hamiltonian wave equations, JOURNAL OF COMPUTATIONAL PHYSICS Volume: 231 Issue: 22 Pages: 7671‐7694 DOI: 10.1016/j.jcp.2012.07.004 Published: SEP 15 2012 7. L.Gr. Ixaru, CP and EF Methods for the Schrodinger Equation. A Comparison, Editor(s): Simos, TE; Psihoyios, G; Tsitouras, C; Anastassi, Z, Source: NUMERICAL ANALYSIS AND APPLIED MATHEMATICS (ICNAAM 2012), VOLS A AND B Book Series: AIP Conference Proceedings Volume: 1479 Pages: 1189‐1192 DOI: 10.1063/1.4756363 Published: 2012 Paper [P252] 1. A. Konguetsof, A hybrid method with phase‐lag and derivatives equal to zero for the numerical integration of the Schrödinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 49 Issue: 7 Pages: 1330‐1356 DOI: 10.1007/s10910‐011‐9824‐5 Published: AUG 2011 2. W. Shi, X.Y. Wu and J.L. Xia, Explicit multi‐symplectic extended leap‐frog methods for Hamiltonian wave equations, JOURNAL OF COMPUTATIONAL PHYSICS Volume: 231 Issue: 22 Pages: 7671‐7694 DOI: 10.1016/j.jcp.2012.07.004 Published: SEP 15 2012 3. J. Shen, E.I.S. Wei, Z.X. Huang, M.S. Chen, and X.L. Wu, High‐oder symplectic FDTD scheme for solving time‐dependent Schrodinger equation, ACTA PHYSICA SINICA Volume: 61 Issue: 19 Article Number: 190202 DOI: 10.7498/aps.61.190202 Published: 2012 4. Jing Shen, Wei E.I. Sha, Zhixiang Huang, Mingsheng Chen, Xianliang Wu, High‐order symplectic FDTD scheme for solving a time‐dependent Schrödinger equation, Computer Physics Communications 184 (2013) 480‐492 5. Huang, ZX (Huang, Zhixiang)[ 1 ] ; Xu, J (Xu, Jie)[ 1 ] ; Sun, BB (Sun, Bingbing)[ 1 ] ; Wu, B (Wu, Bo)[ 1 ] ; Wu, XL (Wu, Xianliang)[ 1,2 ], A new solution of Schrodinger equation based on symplectic algorithm, COMPUTERS & MATHEMATICS WITH APPLICATIONS, Volume: 69 Issue: Page 226 of 379
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