Stochastic exponential integrators for the finite element discretization of SPDEs for multiplicative and additive noise GJ Lord, A Tambue IMA Journal of Numerical Analysis 33 (2), 515-543, 2013 | 125 | 2013 |
An exponential integrator for advection-dominated reactive transport in heterogeneous porous media A Tambue, GJ Lord, S Geiger Journal of Computational Physics 229 (10), 3957-3969, 2010 | 53 | 2010 |
Localized numerical impulse solutions in diffuse neural networks modeled by the complex fractional Ginzburg–Landau equation A Mvogo, A Tambue, GH Ben-Bolie, TC Kofané Communications in Nonlinear Science and Numerical Simulation 39, 396-410, 2016 | 51 | 2016 |
Efficient simulation of geothermal processes in heterogeneous porous media based on the exponential Rosenbrock–Euler and Rosenbrock-type methods A Tambue, I Berre, JM Nordbotten Advances in water resources 53, 250-262, 2013 | 44 | 2013 |
Weak convergence for a stochastic exponential integrator and finite element discretization of stochastic partial differential equation with multiplicative & additive noise A Tambue, JMT Ngnotchouye Applied Numerical Mathematics 108, 57-86, 2016 | 42 | 2016 |
Exponential time integrators for stochastic partial differential equations in 3D reservoir simulation S Geiger, G Lord, A Tambue Computational Geosciences 16, 323-334, 2012 | 41 | 2012 |
Efficient numerical schemes for porous media flow A Tambue Heriot-Watt University, 2010 | 34 | 2010 |
An exponential integrator for finite volume discretization of a reaction–advection–diffusion equation A Tambue Computers & Mathematics with Applications 71 (9), 1875-1897, 2016 | 30 | 2016 |
A modified semi--implict Euler-Maruyama Scheme for finite element discretization of SPDEs with additive noise GJ Lord, A Tambue arXiv preprint arXiv:1004.1998, 2010 | 30 | 2010 |
Stochastic exponential integrators for a finite element discretization of SPDEs GJ Lord, A Tambue arXiv preprint arXiv:1005.5315, 2010 | 28* | 2010 |
A modified semi–implicit Euler–Maruyama scheme for finite element discretization of SPDEs with additive noise GJ Lord, A Tambue Applied Mathematics and Computation 332, 105-122, 2018 | 23 | 2018 |
Strong convergence analysis of the stochastic exponential Rosenbrock scheme for the finite element discretization of semilinear SPDEs driven by multiplicative and additive noise JD Mukam, A Tambue Journal of Scientific Computing 74 (2), 937-978, 2018 | 21 | 2018 |
A note on exponential Rosenbrock–Euler method for the finite element discretization of a semilinear parabolic partial differential equation JD Mukam, A Tambue Computers & Mathematics with Applications 76 (7), 1719-1738, 2018 | 18 | 2018 |
Strong convergence and stability of the semi-tamed and tamed Euler schemes for stochastic differential equations with jumps under non-global Lipschitz condition A Tambue, JD Mukam Int. J. Numer. Anal. Model. 16 (6), 847-872, 2019 | 15 | 2019 |
Strong convergence of the linear implicit Euler method for the finite element discretization of semilinear SPDEs driven by multiplicative or additive noise A Tambue, JD Mukam Applied Mathematics and Computation 346, 23-40, 2019 | 12 | 2019 |
A stochastic delay model for pricing debt and equity: Numerical techniques and applications A Tambue, EK Brown, S Mohammed Communications in Nonlinear Science and Numerical Simulation 20 (1), 281-297, 2015 | 12 | 2015 |
A fitted multi-point flux approximation method for pricing two options RS Koffi, A Tambue Computational Economics 55 (2), 597-628, 2020 | 10 | 2020 |
Convergence of the mimetic finite difference and fitted mimetic finite difference method for options pricing DS Attipoe, A Tambue Applied Mathematics and Computation 401, 126060, 2021 | 9 | 2021 |
Approximation of homogenized coefficients in deterministic homogenization and convergence rates in the asymptotic almost periodic setting W Jäger, A Tambue, JL Woukeng arXiv preprint arXiv:1906.11501, 2019 | 9 | 2019 |
Optimal strong convergence rates of numerical methods for semilinear parabolic SPDE driven by Gaussian noise and Poisson random measure JD Mukam, A Tambue Computers & Mathematics with Applications 77 (10), 2786-2803, 2019 | 8 | 2019 |