An approach to construct higher order time discretisation schemes for time fractional partial differential equations with nonsmooth data NJ Ford, Y Yan Fractional Calculus and Applied Analysis-Fract. Calc. Appl. Anal, 2017 | 48 | 2017 |
A Note on the Well-Posedness of Terminal Value Problems for Fractional Differential Equations. K Diethelm, NJ Ford Journal of Integral Equations and Applications, 2017 | 20 | 2017 |
A primer on experimental and computational rheology with fractional viscoelastic constitutive models LL Ferrás, NJ Ford, ML Morgado, M Rebelo, GH McKinley, JM Nóbrega AIP Conference Proceedings 1843 (1), 020002, 2017 | 13 | 2017 |
Numerical solution for diffusion equations with distributed order in time using a Chebyshev collocation method ML Morgado, M Rebelo, LL Ferras, NJ Ford Applied Numerical Mathematics 114, 108-123, 2017 | 56 | 2017 |
Error estimates of a high order numerical method for solving linear fractional differential equations Z Li, Y Yan, NJ Ford Applied Numerical Mathematics 114, 201-220, 2017 | 34 | 2017 |
Special Issue: The Fifth International Workshop on Analysis and Numerical Approximation of Singular Problems (IWANASP 2015), October 22-24, 2015, Lagos, Algarve, Portugal Preface T Diogo, N Ford, Z Jackiewicz, P Lima, L Morgado, M Rebelo APPLIED NUMERICAL MATHEMATICS 114, 1-1, 2017 | | 2017 |
Numerical investigation of noise induced changes to the solution behaviour of the discrete FitzHugh–Nagumo equation NJ Ford, PM Lima, PM Lumb Applied Mathematics and Computation 293, 448-460, 2017 | 2 | 2017 |
Some time stepping methods for fractional diffusion problems with nonsmooth data Y Yang, Y Yan, NJ Ford Computational Methods in Applied Mathematics, 2017 | 18 | 2017 |
Orthogonality for a class of generalised Jacobi polynomial NJ Ford, H Moayyed, MM Rodrigues Fractional Differential Calculus, 2017 | | 2017 |
An algorithm for the numerical solution of two-sided space-fractional partial differential equations. NJ Ford, K Pal, Y Yan Computational Methods in Applied Mathematics, 2015 | 27 | 2015 |
Fractional Pennes’ bioheat equation: theoretical and numerical studies LL Ferrás, NJ Ford, ML Morgado, JM Nóbrega, MS Rebelo Fractional Calculus and Applied Analysis 18 (4), 1080-1106, 2015 | 68 | 2015 |
A nonpolynomial collocation method for fractional terminal value problems NJ Ford, ML Morgado, M Rebelo Journal of Computational and Applied Mathematics 275, 392-402, 2015 | 32 | 2015 |
MATHEMATICAL MODELLING AND NUMERICAL SIMULATIONS IN NERVE CONDUCTION PM Lima, NJ Ford, PM Lumb International Conference on Bioinspired Systems and Signal Processing 12, 15, 2015 | | 2015 |
Fractional bioheat equation LJL Ferrás, NJ Ford, ML Morgado, JM Nóbrega, M Rebelo CMMSE 2015-15th International Conference Computational and Mathematical …, 2015 | | 2015 |
An implicit finite difference approximation for the solution of the diffusion equation with distributed order in time NJ Ford, ML Morgado, M Rebelo | 52 | 2015 |
Computational methods for a mathematical model of propagation of nerve impulses in myelinated axons PM Lima, NJ Ford, PM Lumb Applied Numerical Mathematics 85, 38-53, 2014 | 15 | 2014 |
On the decay of the elements of inverse triangular Toeplitz matrices NJ Ford, DV Savostyanov, NL Zamarashkin SIAM Journal on Matrix Analysis and Applications 35 (4), 1288-1302, 2014 | 22 | 2014 |
A numerical method for the solution of the time-fractional diffusion equation LL Ferrás, NJ Ford, ML Morgado, M Rebelo International Conference on Computational Science and Its Applications, 117-131, 2014 | 16 | 2014 |
A numerical method for the distributed order time-fractional diffusion equation NJ Ford, ML Morgado, M Rebelo Fractional Differentiation and Its Applications (ICFDA), 2014 International …, 2014 | 25 | 2014 |
Higher order numerical methods for solving fractional differential equations Y Yan, K Pal, NJ Ford BIT Numerical Mathematics 54 (2), 555-584, 2014 | 115 | 2014 |