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Professor Dr T.E. Simos ‐ CV 2. K. Ozawa, Functionally Fitted Runge‐Kutta Methods: A Survey, Information‐ An International Interdisciplinary Journal 12(5), 949‐962(2009) 3. A. Konguetsof, A new two‐step hybrid method for the numerical solution of the Schrodinger equation, Journal of Mathematical Chemistry 47(2), 871‐ 890(2010) 4. O.T. Kosmas and D.S. Vlachos, Phase‐fitted discrete Lagrangian integrators, COMPUTER PHYSICS COMMUNICATIONS 181(3), 562‐568(2010) 5. A. Konguetsof, Two‐step high order hybrid explicit method for the numerical solution of the Schrödinger equation, Journal of Mathematical Chemistry, Journal of Mathematical Chemistry, 48(2), 224‐252(2010) 6. 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 7. 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 8. 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 [P217] 1. G. Psihoyios, Explicit advanced step‐point (EAS) methods and the EAS2 multistep scheme for the solution of non‐stiff initial value problems, Applied Mathematics and Computation, 209 (1): 106‐124 MAR 1 2009 2. Psihoyios G, A family of numerical multistep methods with three distinct schemes: explicit advanced step‐point (EAS) methods and the EAS1 approach, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 46 Issue: 3 Special Issue: Sp. Iss. SI Pages: 866‐895 Published: OCT 2009 3. J.M. Perez‐Jorda, Variational solution of the Schroumldinger equation using plane waves in adaptive coordinates: The radial case, Journal of Chemical Physics 132(2), Article Number: 024110(2010) 4. A. Konguetsof, A new two‐step hybrid method for the numerical solution of the Schrodinger equation, Journal of Mathematical Chemistry 47(2), 871‐890(2010) 5. A. Konguetsof, Two‐step high order hybrid explicit method for the numerical solution of the Schrödinger equation, Journal of Mathematical Chemistry, Journal of Mathematical Chemistry, 48(2), 224‐252(2010) 6. B.G. Xin, J.H. Ma, T. Chen T, Y.Q. Liu , A Fractional Model of Labyrinth Chaos and Numerical Analysis, INTERNATIONAL JOURNAL OF NONLINEAR Page 201 of 379
Professor Dr T.E. Simos ‐ CV SCIENCES AND NUMERICAL SIMULATION Volume: 11 Issue: 10 Pages: 837‐842 Published: OCT 2010 7. 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 [P218] 1. C. Tsitouras, INTERNATIONAL JOURNAL OF MODERN PHYSICS C 17 (6): 861‐ 876 JUN 2006 2. G. Psihoyios, Solving time dependent PDEs via an improved modified extended BDF scheme, Applied Mathematics and Computation, In Press 3. J.Q.W. Lo and B.D. Shizgal, JOURNAL OF MATHEMATICAL CHEMISTRY Volume: 44 Issue: 3 Pages: 787‐801(2008) 4. A. Konguetsof, A new two‐step hybrid method for the numerical solution of the Schrodinger equation, Journal of Mathematical Chemistry 47(2), 871‐ 890(2010) 5. A. Konguetsof, Two‐step high order hybrid explicit method for the numerical solution of the Schrödinger equation, Journal of Mathematical Chemistry, Journal of Mathematical Chemistry, 48(2), 224‐252(2010) 6. 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 [Ρ219] 1. Van de Vyver H (Van de Vyver, H.), A symplectic Runge‐Kutta‐Nyström method with minimal phase‐lag, PHYSICS LETTERS A Volume: 367 Issue: 1‐2 Pages: 16‐24 Published: JUL 16 2007 2. Hans Van De Vyver, Fourth order symplectic integration with reduced phase error, INTERNATIONAL JOURNAL OF MODERN PHYSICS C, 19(8) 1257‐1268, AUG 2008 Paper [Ρ220] 1. A. Konguetsof, Two‐step high order hybrid explicit method for the numerical solution of the Schrödinger equation, Journal of Mathematical Chemistry, Journal of Mathematical Chemistry, 48(2), 224‐252(2010) Paper [P221] Page 202 of 379
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