A further extension of Mittag-Leffler function M Andrić, G Farid, J Pečarić Fractional Calculus and Applied Analysis 21 (5), 1377-1395, 2018 | 62 | 2018 |

A multiple Opial-type inequality for the Riemann–Liouville fractional derivatives M Andrić, J Pečarić, I Perić Journal of Mathematical Inequalities 7 (1), 139-150, 2013 | 19 | 2013 |

Improvements of the Composition Rule for the Canavati Fractional Derivatives and Applications to Opial-Type Inequalities M Andrić, J Pečarić, I Perić 5th Croatian Mathematical Congress, June 18-21, 2012, Rijeka, Croatia, 2012 | 19 | 2012 |

Improvements of composition rule for the Canavati fractional derivatives and applications to Opial-type inequalities M Andrić, J Pečarić, I Perić Dynamic Systems and Applications 20, 383-394, 2011 | 19 | 2011 |

On Composition Identities for the Caputo Fractional Derivatives and Applications to Opial-Type Inequalities M Andrić, J Pečarić, I Perić 2nd International Eurasian Conference on Mathematical Sciences and …, 2013 | 18 | 2013 |

Composition identities for the Caputo fractional derivatives and applications to Opial-type inequalities M Andrić, J Pečarić, I Perić Mathematical Inequalities and Applications 16 (3), 657-670, 2013 | 18 | 2013 |

Opial-type inequality due to Agarwal–Pang and fractional differential inequalities M Andrić, A Barbir, G Farid, J Pečarić Integral Transforms and Special Functions 25 (4), 324-335, 2014 | 16 | 2014 |

An Opial-type integral inequality and exponentially convex functions M Andrić, A Barbir, S Iqbal, J Pečarić Fractional Differential Calculus 5 (1), 25-42, 2015 | 6 | 2015 |

More on certain Opial-type inequality for fractional derivatives and exponentially convex functions M Andric, A Barbir, G Farid, J Pecaric Nonlinear Funct. Anal. Appl 19, 563-583, 2014 | 5 | 2014 |

Refinements of some integral inequalities for unified integral operators CY Jung, G Farid, M Andrić, J Pečarić, YM Chu Journal of Inequalities and Applications 2021 (1), 1-13, 2021 | 4 | 2021 |

Generalizations of Opial-type inequalities in several independent variables M Andrić, A Barbir, J Pečarić, G Roqia Demonstratio Mathematica 47 (4), 839-847, 2014 | 4 | 2014 |

On Willett’s, Godunova-Levin’s, and Rozanova’s Opial-type inequalities with related Stolarsky-type means M Andrić, A Barbir, J Pečarić Mathematical Notes 96 (5-6), 841-854, 2014 | 4 | 2014 |

More on certain Opial-type inequality for fractional derivatives and exponentially convex functions M Andrić, A Barbir, G Farid, J Pečarić Nonlinear Functional Analysis and Applications 19 (4), 563-584, 2014 | 4 | 2014 |

Refinements of Some Integral Inequalities for-Convex Functions G Farid, YM Chu, M Andrić, CY Jung, J Pečarić, SM Kang Mathematical Problems in Engineering 2020, 2020 | 3 | 2020 |

Refinement and corrigendum of bounds of fractional integral operators containing Mittag-Leffler functions G Farid, M Andrić, M Saddiqa, J Pečarić, CY Jung AIMS Mathematics 5 (6), 7332-7349, 2020 | 3 | 2020 |

A generalization of Mittag-Leffler function associated with Opial type inequalities due to Mitrinovic and Pecaric M Andric, G Farid Preprint, 2019 | 3 | 2019 |

Inequalities of Opial and Jensen (Improvements of Opial-type inequalities with applications to fractional calculus) M Andrić, J Pečarić, I Perić Element, 2015 | 3 | 2015 |

General multiple Opial-type inequalities for the Canavati fractional derivatives M Andrić, J Pečarić, I Perić Annals of Functional Analysis 4 (1), 149-162, 2013 | 3 | 2013 |

An Opial-type inequality for fractional derivatives of two functions M Andrić, J Pečarić, I Perić Fractional Differential Calculus 3 (1), 55-68, 2013 | 3 | 2013 |

POLYA–SZEG O AND CHEBYSHEV TYPES INEQUALITIES VIA AN EXTENDED GENERALIZED MITTAG–LEFFLER FUNCTION M Andric, G Farid, S Mehmood, J Pecaric Math. Inequal. Appl 22 (4), 1365-1377, 2019 | 2 | 2019 |