中南大学 Yufeng Xu

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Yufeng Xu

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[21]K. Kumar, R.K. Pandey, S. Sharma, Y. Xu.Numerical scheme with convergence for a generalized time-fractional Telegraph-type equation[J].Numerical Methods for PDEs, 2019, 35 (3) : 1164-1183.
[22]Y. Xu, Z. Wang.Quenching phenomenon of a time-fractional Kawarada equation[J].Journal of Computational and Nonlinear Dynamics, 2018, 13: 101010-1.
[23]Q. Xu, Y. Xu, Extremely low order time-fractional differential equation and application in combustion process[J].Commun Nonlinear Science Numerical Simulat, 2018 (64) : 135-148.
[24]Y. Xu, H.W. Sun, Q. Sheng.On variational properties of balanced central fractional derivatives[J].International Journal of Computer Mathematics, 2018, (6-7) (95) : 1195-1209.
[25]Y. Xu.Quenching phenomenon in a fractional diffusion equation and its numerical simulation[J].International Journal of Computer Mathematics, 2017, 1 (95) : 98-113.
[26]Y. Xu, Z. Zheng.Quenching phenomenon of a time-fractional diffusion equation with singular source term[J].Mathematical Methods in the Applied Sciences, 2017, 16 (40) : 5750-5759.
[27]Y. Xu.Dynamic behaviors of generalized fractional chaotic systems[J].Acta Automatica Sinica, 2017, 9 (43) : 1619-1624.
[28]Y. Xu.Fractional boundary value problems with integral and anti-periodic boundary conditions[J].Bulletin of the Malaysian Math Sciences, 2016, 2 (39) : 571-587.
[29]O.P. Agrawal, Y. Xu.Generalized vector calculus on convex domain[J].Commun Nonlinear Sci Numer Simulat, 2015, (1-3) (23) : 129-140.
[30]Y. Xu, V.S. Erturk.A finite difference technique for solving variable-order fractional integro-differential equations[J].Bull. Iranian Math. Soc., 2014, 40 (3) : 699-712.
[31]Y. Xu, O.P. Agrawal, N. Pathak.Solution of new generalized diffusion-wave equation defined in a bounded domain[J].Journal of Applied Nonlinear Dynamics, 2014, 3 (2) : 159-171.
[32]Y. Xu, O.P. Agrawal.Models and numerical solutions of generalized oscillator equations[J].Journal of Vibration and Acoustics, 2014, 136 (5) : 151903-1.
[33]Y. Xu, Z. He.Existence of solutions for nonlinear high-order fractional boundary value problem with integral boundary condition[J].J. Appl. Math. Comput., 2013, 44: 417-435.
[34]Y. Xu, O.P. Agrawal.Numerical solutions and analysis of diffusion for new generalized fractional advection-diffusion equations[J].Central Euro J. Phys., 2013, 11 (10) : 1178-1193.
[35]Y. Xu, Z. He.Existence and uniqueness results for Cauchy problem of variable-order fractional differential equations[J].J. Appl. Math. Comput., 2013, 43: 295-306.
[36]Y. Xu, O.P. Agrawal.Models and numerical schemes for generalized van der Pol equations[J].Commun Nonlinear Sci Numer Simulat, 2013, 18 (12) : 3575-3589.
[37]Y. Xu, Z. He.Synchronization of variable-order fractional financial system via active control method[J].Central Euro J. Phys., 2013, 11 (6) : 824-835.
[38]Y. Xu, Z. He, O.P. Agrawal.Numerical and analytical solutions of new generalized fractional diffusion equation[J].Computers and Mathematics with Applications, 2013, 66: 2019-2029.
[39]Y. Xu, O.P. Agrawal.Numerical solutions and analysis of diffusion for new generalzied fractional Burgers equation[J].Fract. Calc. Appl. Anal., 2013, 16 (3) : 709-736.
[40]Y. Xu, Z. He, Q. Xu.Numerical solutions of fractional advection-diffusion equations with a kind of new generalized fractional derivative[J].International Journal of Computer Mathematics, 2013, 91 (3) : 588-600.

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