CURRICULUM VITAE
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Professor Dr T.E. Simos ‐ CV<br />
7. Q.H. Ming, Y.P. Yang, Y.L. Fang, An Optimized Runge‐Kutta Method for the<br />
Numerical Solution of the Radial Schrodinger Equation, MATHEMATICAL<br />
PROBLEMS IN ENGINEERING Article Number: 867948 DOI:<br />
10.1155/2012/867948 Published: 2012<br />
8. Y.L. Fang, Q.H. Li, Q.H. Ming, and K.M. Wang, A New Optimized Runge‐Kutta<br />
Pair for the Numerical Solution of the Radial Schrodinger Equation, ABSTRACT<br />
AND APPLIED ANALYSIS Article Number: 641236 DOI: 10.1155/2012/641236<br />
Published: 2012<br />
9. Fang, YL (Fang, Yonglei)[ 1 ] ; You, X (You, Xiong)[ 2,3 ] ; Ming, QH (Ming,<br />
Qinghe)[ 1 ], New optimized explicit modified RKN methods for the numerical<br />
solution of the Schrodinger equation, JOURNAL OF MATHEMATICAL CHEMISTRY<br />
Volume: 51 Issue: 1 Pages: 390‐411 DOI: 10.1007/s10910‐012‐0090‐y<br />
Published: JAN 2013<br />
10. You, X (You, Xiong)[ 1,2 ] ; Chen, ZX (Chen, Zhaoxia)[ 1 ] ; Fang, YL (Fang,<br />
Yonglei)[ 3 ], New explicit adapted Numerov methods for second‐order<br />
oscillatory differential equations, APPLIED MATHEMATICS AND COMPUTATION<br />
Volume: 219 Issue: 11 Pages: 6241‐6255 DOI: 10.1016/j.amc.2012.12.026<br />
Published: FEB 1 2013<br />
11. Liu, SW (Liu, Shiwei)[ 1 ] ; Zheng, J (Zheng, Juan)[ 1 ] ; Fang, YL (Fang,<br />
Yonglei)[ 1 ], A new modified embedded 5(4) pair of explicit Runge‐Kutta<br />
methods for the numerical solution of the Schrodinger equation, JOURNAL OF<br />
MATHEMATICAL CHEMISTRY Volume: 51 Issue: 3 Pages: 937‐953 DOI:<br />
10.1007/s10910‐012‐0127‐2 Published: MAR 2013<br />
12. Fang, YL (Fang, Yonglei); You, X (You, Xiong); Ming, QH (Ming, Qinghe), A<br />
new phase‐fitted modified Runge‐Kutta pair for the numerical solution of the<br />
radial Schrodinger equation, APPLIED MATHEMATICS AND COMPUTATION,<br />
Volume: 224 Pages: 432‐441, DOI: 10.1016/j.amc.2013.08.081, Published: NOV<br />
1 2013<br />
13. Fang, YL (Fang, Yonglei)[ 1 ] ; You, X (You, Xiong)[ 2 ], New optimized twoderivative<br />
Runge‐Kutta type methods for solving the radial Schrodinger<br />
equation, JOURNAL OF MATHEMATICAL CHEMISTRY, Volume: 52 Issue: 1<br />
Pages: 240‐254, DOI: 10.1007/s10910‐013‐0259‐z, Published: JAN 2014<br />
14. Fang, YL (Fang, Yonglei)[ 1 ] ; You, X (You, Xiong)[ 2 ] ; Ming, QH (Ming,<br />
Qinghe)[ 1 ], Trigonometrically fitted two‐derivative Runge‐Kutta methods for<br />
solving oscillatory differential equations, NUMERICAL ALGORITHMS, Volume: 65<br />
Issue: 3 Pages: 651‐667 Special Issue: SI, DOI: 10.1007/s11075‐013‐9802‐z,<br />
Published: MAR 2014<br />
15. Franco, JM (Franco, J. M.)[ 1 ] ; Khiar, Y (Khiar, Y.)[ 1 ] ; Randez, L (Randez,<br />
L.)[ 1 ], Two new embedded pairs of explicit Runge‐Kutta methods adapted to<br />
the numerical solution of oscillatory problems, APPLIED MATHEMATICS AND<br />
COMPUTATION, Volume: 252 Pages: 45‐57, DOI: 10.1016/j.amc.2014.11.097,<br />
Published: FEB 1 2015<br />
16. Zhang, Yanwei; Che, Haitao; Fang, Yonglei; et al., A New Trigonometrically<br />
Fitted Two‐Derivative Runge‐Kutta Method for the Numerical Solution of the<br />
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