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Professor Dr T.E. Simos ‐ CV 1. B. Neta, P‐stable high‐order super‐implicit and Obrechkoff methods for periodic initial value problems, COMPUTERS & MATHEMATICS WITH APPLICATIONS Volume: 54 Issue: 1 Pages: 117‐126 Published: JUL 2007 2. Ben Sassi A (Ben Sassi, A.), Harzallah‐Skhiri F (Harzallah‐Skhiri, F.), Bourgougnon N (Bourgougnon, N.), Aouni M (Aouni, M.), Antiviral activity of some Tunisian medicinal plants against Herpes simplex virus type 1, NATURAL PRODUCT RESEARCH Volume: 22 Issue: 1 Pages: 53‐65 Published: 2008 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. 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) 5. A. Shokri, M.Y.R. Ardabili, S. Shahmorad and G. Hojjati, A new two‐step P‐ stable hybrid Obrechkoff method for the numerical integration of second‐order IVPs, JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS Volume: 235 Issue: 6 Pages: 1706‐1712 Published: JAN 15 2011 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. S.D. Achar, Symmetric multistep Obrechkoff methods with zero phase‐lag for periodic initial value problems of second order differential equations, APPLIED MATHEMATICS AND COMPUTATION Volume: 218 Issue: 5 Pages: 2237‐2248 DOI: 10.1016/j.amc.2011.07.040 Published: NOV 1 2011 8. 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 9. Shokri, A (Shokri, Ali)[ 1 ] ; Saadat, H (Saadat, Hosein)[ 1 ], Trigonometrically fitted high‐order predictor‐corrector method with phase‐lag of order infinity for the numerical solution of radial Schrodinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY, Volume: 52 Issue: 7 Pages: 1870‐1894, DOI: 10.1007/s10910‐014‐0353‐x, Published: AUG 2014 10. Shokri, A (Shokri, Ali), AN EXPLICIT TRIGONOMETRICALLY FITTED TEN‐STEP METHOD WITH PHASE‐LAG OF ORDER INFINITY FOR THE NUMERICAL SOLUTION OF THE RADIAL SCHRODINGER EQUATION, APPLIED AND COMPUTATIONAL MATHEMATICS, Volume: 14 Issue: 1 Pages: 63‐74, Published: 2015 11. Shokri, A (Shokri, Ali)[ 1 ] ; Saadat, H (Saadat, Hosein)[ 1 ], High phase‐lag order trigonometrically fitted two‐step Obrechkoff methods for the numerical solution of periodic initial value problems, NUMERICAL ALGORITHMS, Volume: 68 Issue: 2 Pages: 337‐354, DOI: 10.1007/s11075‐014‐9847‐7, Published: FEB 2015 Page 181 of 379
Professor Dr T.E. Simos ‐ CV Paper [P192] 1. Van de Vyver H, Comp. Phys. Com. 167, 129‐142 (2005) 2. J.I. Ramos, APPLIED MATHEMATICS AND COMPUTATION 181 (1): 123‐146 OCT 1 2006 3. H. Van de Vyver, INTERNATIONAL JOURNAL OF MODERN PHYSICS C 17 (5): 663‐675 MAY 2006 4. J.I. Ramos, CHAOS SOLITONS & FRACTALS 28 (5): 1306‐1313 JUN 2006 5. Van De Vyver H (Van de Vyver, Hans), Phase‐fitted and amplification‐fitted two‐step hybrid methods for y '' = f (x, y), JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS Volume: 209 Issue: 1 Pages: 33‐53 Published: DEC 1 2007 6. Van de Vyver H, An explicit Numerov‐type method for second‐order differential equations with oscillating solutions, COMPUTERS & MATHEMATICS WITH APPLICATIONS Volume: 53 Issue: 9 Pages: 1339‐1348 Published: MAY 2007 7. Fang, YL (Fang, Yonglei)[ 1 ] ; You, X (You, Xiong)[ 2 ] ; Ming, QH (Ming, Qinghe)[ 1 ], EXPONENTIALLY FITTED TWO‐DERIVATIVE RUNGE‐KUTTA METHODS FOR THE SCHRODINGER EQUATION, INTERNATIONAL JOURNAL OF MODERN PHYSICS C Volume: 24 Issue: 10 Article Number: 1350073 DOI: 10.1142/S0129183113500733 Published: OCT 2013 Paper [P193] 1. J.I. Ramos, APPLIED MATHEMATICS AND COMPUTATION 181(1): 123‐146 OCT 1 2006 2. 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) 3. 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) 4. 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 5. 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 6. Monovasilis Th, Symplectic partitioned Runge‐Kutta methods with the phase‐lag property, APPLIED MATHEMATICS AND COMPUTATION Page 182 of 379
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