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Professor Dr T.E. Simos ‐ CV ENGINEERING Article Number: 316852 DOI: 10.1155/2012/316852 Published: 2012 12. Billoux, T (Billoux, T.); Cressault, Y (Cressault, Y.); Gleizes, A (Gleizes, A.)[ 1 ], Tables of radiative transition probabilities for the main diatomic molecular systems of OH, CH, CH+, CO and CO+ occurring in CO‐H‐2 syngas‐type plasma, JOURNAL OF QUANTITATIVE SPECTROSCOPY & RADIATIVE TRANSFER, Volume: 133 Pages: 434‐444, DOI: 10.1016/j.jqsrt.2013.09.005, Published: JAN 2014 Paper [P16] 1. J.P. Coleman and L.Gr. Ixaru, IMA J. Numer. Anal. 16, 179‐199(1996). 2. L. Gr. Ixaru and M. Rizea, J. Comput. Appl. Math. 79, 87‐99(1997). 3. L.Gr. Ixaru, Computer Physics Communications, 105, 1‐19(1997). 4. B. Paternoster, Applied Numerical Mathematics, 28, 401‐412(1998). 5. L.Gr. Ixaru and B. Paternoster, Journal of Computational and Applied Mathematics 106, 87‐98(1999). 6. J.P. Coleman and S.C. Duxbury, Journal of Computational and Applied Mathematics, 126, 47‐75(2000). 7. L.Gr. Ixaru, Computers & Chemistry, 25, 39‐53(2001). 8. B. Paternoster, Applied Numerical Mathematics, 35, 339‐355(2000). 9. K. Ozawa, Japan Journal of Industrial and Applied Mathematics, 19, 55‐ 85(2002). 10. . G. Vanden Berghe and L.Gr. Ixaru, “Exponential Fitting”, Kluewer Publications, Volume 568, 2004. 11. M. Lambiris, Ch. Tsitouras and K. Evmorfopoulos, Proceedings of the International Conference of Computational Methods in Sciences and Engineering (ICCMSE 2003) (Ed. T.E. Simos), World Scientific Publishing Co, pp. 337‐339(2003). 12. J.M. Franco, Applied Numerical Mathematics, 50, 427‐443(2004). 13. Yongming Dai, Zhongcheng Wang, Deying Zhao, Xiaolong Song, Computer Physics Communications, 165, 110–126(2005) 14. Van de Vyver H, Computer Physics Communications, 166, 109‐122 (2005) 15. Z.C. Wang and Y.Wang, COMPUTER PHYSICS COMMUNICATIONS 171 (2): 79‐ 92 SEP 15 2005 16. Z.C. Wang, COMPUTER PHYSICS COMMUNICATIONS 171 (3): 162‐174 OCT 1 2005 17. Van de Vyver H, COMPUTER PHYSICS COMMUNICATIONS 173 (3): 115‐130 DEC 15 2005 18. Van de Vyver H, Applied Mathematics and Computation, 171 (2): 1025‐1036 DEC 15 2005 19. J.I. Ramos, APPLIED MATHEMATICS AND COMPUTATION 181 (1): 123‐146 OCT 1 2006 20. H. Van de Vyver, INTERNATIONAL JOURNAL OF MODERN PHYSICS C 17 (5): 663‐675 MAY 2006 Page 87 of 379
Professor Dr T.E. Simos ‐ CV 21. H. Van de Vyver,PHYSICS LETTERS A 352 (4‐5): 278‐285 APR 3 2006 22. D.M. Wu and Z.C. Wang, COMPUTER PHYSICS COMMUNICATIONS 174 (6): 447‐463 MAR 15 2006 23. Y.M. Dai, Z.C. Wang, D.M. Wu, JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS 187 (2): 192‐201 MAR 15 2006 24. H. Van de Vyver, INTERNATIONAL JOURNAL OF MODERN PHYSICS C 16 (6): 879‐894 JUN 2005 25. 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 26. Hans Van de Vyver, An adapted explicit hybrid method of Numerov‐type for the numerical integration of perturbed oscillators, Applied Mathematics and Computation, Volume: 186 Issue: 2 Pages: 1385‐1394 Published: MAR 15 2007 27. 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 28. Van Daele M (Van Daele, Marnix), Vanden Berghe G (Vanden Berghe, Guido), P‐stable Obrechkoff methods of arbitrary order for second‐order differential equations, NUMERICAL ALGORITHMS Volume: 44 Issue: 2 Pages: 115‐131 Published: FEB 2007 29. Van Daele M (Van Daele, M.), Vanden Berghe G (Vanden Berghe, G.), P‐ stable exponentially‐fitted Obrechkoff methods of arbitrary order for secondorder differential equations, NUMERICAL ALGORITHMS Volume: 46 Issue: 4 Pages: 333‐350 Published: DEC 2007 30. G. Vanden Berghe, M. Van Daele, Exponentially‐fitted Obrechkoff methods for second‐order differential equations, Applied Numerical Mathematics, In Press, Corrected Proof, Available online 21 March 2008 31. Hans Van De Vyver, Fourth order symplectic integration with reduced phase error, INTERNATIONAL JOURNAL OF MODERN PHYSICS C, 19(8) 1257‐1268, AUG 2008 32. 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) 33. 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) 34. 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 Page 88 of 379
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