Parameter estimation of the nonlinear Muskingum flood-routing model using a hybrid harmony search algorithm H Karahan, G Gurarslan, ZW Geem Journal of Hydrologic Engineering 18 (3), 352-360, 2013 | 167 | 2013 |
A sixth-order compact finite difference scheme to the numerical solutions of Burgers’ equation M Sari, G Gürarslan Applied Mathematics and Computation 208 (2), 475-483, 2009 | 118 | 2009 |
High-order finite difference schemes for solving the advection-diffusion equation M Sari, G Gürarslan, A Zeytinoğlu Mathematical and Computational Applications 15 (3), 449-460, 2010 | 79 | 2010 |
Numerical Solution of Advection-Diffusion Equation Using a Sixth-Order Compact Finite Difference Method G Gurarslan, H Karahan, D Alkaya, M Sari, M Yasar | 67 | 2013 |
A new nonlinear Muskingum flood routing model incorporating lateral flow H Karahan, G Gurarslan, ZW Geem Engineering Optimization 47 (6), 737-749, 2015 | 66 | 2015 |
PSOLVER: A new hybrid particle swarm optimization algorithm for solving continuous optimization problems AH Kayhan, H Ceylan, MT Ayvaz, G Gurarslan Expert Systems with Applications 37 (10), 6798-6808, 2010 | 66 | 2010 |
Solving inverse problems of groundwater-pollution-source identification using a differential evolution algorithm G Gurarslan, H Karahan Hydrogeology Journal 23 (6), 1109, 2015 | 65 | 2015 |
Hybridizing the harmony search algorithm with a spreadsheet ‘Solver’ for solving continuous engineering optimization problems MT Ayvaz, AH Kayhan, H Ceylan, G Gurarslan TAYLOR & FRANCIS LTD, 2009 | 65 | 2009 |
A compact finite difference method for the solution of the generalized Burgers–Fisher equation M Sari, G Gürarslan, İ Dağ Numerical Methods for Partial Differential Equations: An International …, 2010 | 63 | 2010 |
Numerical Solutions of the Generalized Burgers-Huxley Equation by a Differential Quadrature Method M Sari, G Gurarslan Mathematical Problems in Engineering 2009 (Article ID 370765), 1-11, 2009 | 53 | 2009 |
High‐order finite difference schemes for numerical solutions of the generalized Burgers–Huxley equation M Sari, G Gürarslan, A Zeytinoğlu Numerical Methods for Partial Differential Equations 27 (5), 1313-1326, 2011 | 50 | 2011 |
A sixth‐order compact finite difference method for the one‐dimensional sine‐Gordon equation M Sari, G Gürarslan International Journal for Numerical Methods in Biomedical Engineering 27 (7 …, 2011 | 43 | 2011 |
Reply to comment on “Evaluation of a physically based quasi-linear and a conceptually based nonlinear Muskingum methods” by Reza Barati M Perumal, G Tayfur, CM Rao, G Gurarslan Journal of Hydrology 550, 740-742, 2017 | 40* | 2017 |
Numerical solutions of linear and nonlinear diffusion equations by a differential quadrature method (DQM) G Gürarslan, M Sari International Journal for Numerical Methods in Biomedical Engineering 27 (1 …, 2011 | 34 | 2011 |
A new partitioning approach for nonlinear Muskingum flood routing models with lateral flow contribution MT Ayvaz, G Gurarslan Journal of Hydrology 553, 142-159, 2017 | 30 | 2017 |
A solution to the telegraph equation by using DGJ method M Sari, A Gunay, G Gurarslan International Journal of Nonlinear Science 17 (1), 57-66, 2014 | 30 | 2014 |
Numerical modelling of linear and nonlinear diffusion equations by compact finite difference method G Gürarslan Applied Mathematics and Computation 216 (8), 2472-2478, 2010 | 29 | 2010 |
Numerical solution of advection-diffusion equation using operator splitting method E Bahar, G Gürarslan International Journal of Engineering and Applied Sciences 9 (4), 76-88, 2017 | 23 | 2017 |
High‐order finite difference schemes for the solution of the generalized Burgers–Fisher equation M Sari, G Gürarslan, A Zeytinoğlu International Journal for Numerical Methods in Biomedical Engineering 27 (8 …, 2011 | 14 | 2011 |
River Flow Estimation from Upstream Flow Records Using Support Vector Machines H Karahan, S Iplikci, M Yasar, G Gurarslan Journal of Applied Mathematics, 2014 | 13 | 2014 |