Fixed point theorems for α–ψ-contractive type mappings B Samet, C Vetro, P Vetro Nonlinear analysis: theory, methods & applications 75 (4), 2154-2165, 2012 | 1494 | 2012 |

A new generalization of the Banach contraction principle M Jleli, B Samet Journal of inequalities and applications 2014, 1-8, 2014 | 386 | 2014 |

Coupled fixed point theorems for a generalized Meir–Keeler contraction in partially ordered metric spaces B Samet Nonlinear Analysis: Theory, Methods & Applications 72 (12), 4508-4517, 2010 | 378 | 2010 |

Fixed point results for mappings satisfying (ψ, φ)-weakly contractive condition in partially ordered metric spaces HK Nashine, B Samet Nonlinear Analysis: Theory, Methods & Applications 74 (6), 2201-2209, 2011 | 251 | 2011 |

Common fixed points of generalized contractions on partial metric spaces and an application L Ćirić, B Samet, H Aydi, C Vetro Applied Mathematics and Computation 218 (6), 2398-2406, 2011 | 249 | 2011 |

A study of fractional Lotka‐Volterra population model using Haar wavelet and Adams‐Bashforth‐Moulton methods S Kumar, R Kumar, RP Agarwal, B Samet Mathematical Methods in the Applied Sciences 43 (8), 5564-5578, 2020 | 243 | 2020 |

Chaotic behaviour of fractional predator-prey dynamical system S Kumar, R Kumar, C Cattani, B Samet Chaos, Solitons & Fractals 135, 109811, 2020 | 202 | 2020 |

Coupled fixed point theorems for nonlinear contractions in partially ordered G-metric spaces H Aydi, B Damjanović, B Samet, W Shatanawi Mathematical and Computer Modelling 54 (9-10), 2443-2450, 2011 | 198 | 2011 |

Remarks on *G*-metric spaces and fixed point theoremsM Jleli, B Samet Fixed Point Theory and Applications 2012, 1-7, 2012 | 197 | 2012 |

Coupled fixed point, -invariant set and fixed point of -order B Samet, C Vetro Annals of functional analysis 1 (2), 46-56, 2010 | 196 | 2010 |

Coupled fixed point theorems for mixed monotone mappings in ordered partial metric spaces W Shatanawi, B Samet, M Abbas Mathematical and Computer Modelling 55 (3-4), 680-687, 2012 | 193 | 2012 |

An analysis for heat equations arises in diffusion process using new Yang‐Abdel‐Aty‐Cattani fractional operator S Kumar, S Ghosh, B Samet, EFD Goufo Mathematical Methods in the Applied Sciences 43 (9), 6062-6080, 2020 | 175 | 2020 |

New fixed point theorems for generalized F-contractions in complete metric spaces J Ahmad, A Al-Rawashdeh, A Azam Fixed Point Theory and Applications 2015 (1), 1-18, 2015 | 175 | 2015 |

A generalized metric space and related fixed point theorems M Jleli, B Samet Fixed point theory and Applications 2015 (1), 1-14, 2015 | 174 | 2015 |

The topological asymptotic expansion for the Maxwell equations and some applications M Masmoudi, J Pommier, B Samet Inverse Problems 21 (2), 547, 2005 | 159 | 2005 |

A new Rabotnov fractional‐exponential function‐based fractional derivative for diffusion equation under external force S Kumar, KS Nisar, R Kumar, C Cattani, B Samet Mathematical Methods in the Applied Sciences 43 (7), 4460-4471, 2020 | 157 | 2020 |

The topological asymptotic for the Helmholtz equation B Samet, S Amstutz, M Masmoudi SIAM Journal on Control and Optimization 42 (5), 1523-1544, 2003 | 155 | 2003 |

Nonlinear contractions involving simulation functions in a metric space with a partial order H Argoubi, B Samet, C Vetro J. Nonlinear Sci. Appl 8 (6), 1082-1094, 2015 | 151 | 2015 |

Discussion on: a fixed point theorem of Banach-Caccioppoli type on a class of generalized metric spaces by A. Branciari B Samet Publ. Math. Debrecen 76 (4), 493-494, 2010 | 142 | 2010 |

A wavelet based numerical scheme for fractional order SEIR epidemic of measles by using Genocchi polynomials S Kumar, R Kumar, MS Osman, B Samet Numerical Methods for Partial Differential Equations 37 (2), 1250-1268, 2021 | 140 | 2021 |