https://orcid.org/0000-0003-1144-5315
References
- M. Asl, M. Javidi, and Y. Yan, A novel high-order algorithm for the numerical estimation of fractional differential equations, J. Comput. Appl. Math. 342 (2018), pp. 180–202.
- K. Atkinson, The Numerical Solution of Integral Equations of the Second Kind, Cambridge University Press, New York, 1997.
- B. Bialecki and R. Fernandes, Alternating direction implicit orthogonal spline collocation on some non-rectangular regions with inconsistent partitions, Numer. Algor. 74 (2017), pp. 1083–1100.
- H. Brunner, The numerical solution of weakly singular Volterra integral equations by collocation on graded meshes, Math. Comput. 45 (1985), pp. 417–437.
- S. Chen and F. Liu, ADI-Euler and extrapolation methods for the two-dimensional advection-dispersion equation, J. Appl. Math. Comput. 26 (2008), pp. 295–311.
- H. Chen, D. Xu, and Y. Peng, A second order BDF alternating direction implicit difference scheme for the two-dimensional fractional evolution equation, Appl. Math. Model. 41 (2017), pp. 54–67.
- H. Chen, D. Xu, and J. Zhou, A second-order accurate numerical method with graded meshes for an evolution equation with a weakly singular kernel, J. Comput. Appl. Math. 356 (2019), pp. 152–163.
- B. Cockburn and K. Mustapha, A hybridizable discontinuous Galerkin method for fractional diffusion problems, Numer. Math. 130 (2015), pp. 293–314.
- G. Fairweather, Spline collocation methods for a class of hyperbolic partial integro-differential equations, SIAM J. Numer. Anal. 31 (1994), pp. 444–460.
- G. Fairweather, X. Yang, D. Xu, and H. Zhang, An ADI Crank-Nicolson orthogonal spline collocation method for the two-dimensional fractional diffusion wave equation, J. Sci. Comput. 65 (2015), pp. 1217–1239.
- R. Fernandes and G. Fairweather, Analysis of alternating direction collocation methods for parabolic and hyperbolic problems in two space variables, Numer. Methods Partial Differ. Equ. 9 (1993), pp. 191–211.
- R. Garrappa, Trapezoidal methods for fractional differential equations: Theoretical and computational aspects, Math. Comput. Simul. 110 (2015), pp. 96–112.
- L. Li and D. Xu, Alternating direction implicit-Euler method for the two dimensional fractional evolution equation, J. Comput. Phys. 236 (2013), pp. 157–168.
- C. Li, Q. Yi, and A. Chen, Finite difference methods with non-uniform meshes for nonlinear fractional differential equations, J. Comput. Phys. 316 (2016), pp. 614–631.
- Y. Liu, J. Roberts, and Y. Yan, A note on finite difference methods for nonlinear fractional differential equations with non-uniform meshes, Int. J. Comput. Math. 95 (2018), pp. 1151–1169.
- J. Ma and Y. Jiang, On graded mesh method for a class of weakly singular Volterra integral equations, J. Comput. Appl. Math. 231 (2009), pp. 807–814.
- W. McLean and K. Mustapha, A second-order accurate numerical method for a fractional wave equation, Numer. Math. 105 (2006), pp. 481–510.
- W. Mclean and V. Thomée, Numerical solution of an evolution equation with a positive-type memory term, J. Austral. Math. Soc. Ser. B 35 (1993), pp. 23–70.
- W. Mclean and V. Thomée, Maximum-norm error analysis of a numerical solution via Laplace transformation and quadrature of a fractional-order evolution equation, IMA J. Numer. Anal. 30 (2010), pp. 208–230.
- W. McLean, V. Thomée, and L. Wahlbin, Discretization with variable time steps of an evolution equation with a positive-type memory term, J. Comput. Appl. Math. 69 (1996), pp. 49–69.
- A. Pani, G. Fairweather, and R. Fernandes, Alternating direction implicit orthogonal spline collocation methods for an evolution equation with a positive-type memory term, SIAM J. Numer. Anal. 46 (2008), pp. 344–364.
- A. Pani, G. Fairweather, and R. Fernandes, Orthogonal spline collocation methods for partial integro-differential equations, SIAM J. Numer. Anal. 30 (2010), pp. 248–276.
- P. Percell and M. Wheeler, A C1 finite element collocation method for elliptic partial differential equations, SIAM J. Numer. Anal. 17 (1980), pp. 923–939.
- L. Qiao, Z. Wang, and D. Xu, An alternating direction implicit orthogonal spline collocation method for the two dimensional multi-term time fractional integro-differential equation, Appl. Numer. Math.151 (2020), pp. 199–212.
- L. Qiao and D. Xu, Compact ADI scheme for integro-differential equations of parabolic type, J. Sci. Comput. 76 (2018), pp. 565–582.
- L. Qiao and D. Xu, BDF ADI orthogonal spline collocation scheme for the fractional integro-differential equation with two weakly singular kernels, Comput. Math. Appl. 78 (2019), pp. 3807–3820.
- L. Qiao and D. Xu, A fast ADI orthogonal spline collocation method with graded meshes for the two-dimensional fractional integro-differential equation, Adv. Comput. Math. 47 (2021). https://doi.org/https://doi.org/10.1007/s10444-021-09884-5.
- L. Qiao, D. Xu, and Z. Wang, An ADI difference scheme based on fractional trapezoidal rule for fractional integro-differential equation with a weakly singular kernel, Appl. Math. Comput. 354 (2019), pp. 103–114.
- L. Qiao, D. Xu, and Y. Yan, High-order ADI orthogonal spline collocation method for a new 2D fractional integro-differential problem, Math. Methods Appl. Sci. (2020). DOI: https://doi.org/10.1002/mma.6258.
- W. Qiu, D. Xu, H. Chen, and J. Guo, An alternating direction implicit Galerkin finite element method for the distributed-order time-fractional mobile-immobile equation in two dimensions, Comput. Math. Appl. 80 (2020), pp. 3156–3172.
- J. Ren and Z. Sun, Numerical algorithm with high spatial accuracy for the fractional diffusion-wave equation with Neumann boundary conditions, J. Sci. Comput. 56 (2013), pp. 381–408.
- T. Tang, A note on collocation methods for Volterra intgro-differential equations with weakly singular kernels, IMA J. Numer. Anal. 13 (1993), pp. 93–99.
- Y. Xing and Y. Yan, A higher order numerical method for time fractional partial differential equations with nonsmooth data, J. Comput. Phys. 357 (2018), pp. 305–323.
- Y. Zhang, Z. Sun, and H. Liao, Finite difference methods for the time fractional diffusion equation on non-uniform meshes, J. Comput. Phys. 265 (2014), pp. 195–210.