| The k-Mittag-Leffler function GA Dorrego, RA Cerutti Int. J. Contemp. Math. Sci 7 (15), 705-716, 2012 | 160 | 2012 |
| On the k-Riemann-Liouville fractional derivative LG Romero, LL Luque, GA Dorrego, RA Cerutti Int. J. Contemp. Math. Sci 8 (1), 41-51, 2013 | 75 | 2013 |
| An alternative definition for the k-Riemann liouville fractional derivative GA Dorrego Hikari Ltd, 2015 | 40 | 2015 |
| The k-Bessel function of first kind LG Romero, GA Dorrego, RA Cerutti Int. Math. Forum 38 (7), 1859-1854, 2012 | 32 | 2012 |
| Generalized Riemann-Liouville Fractional Operators Associated with a Generalization of the Prabhakar Integral Operator GA Dorrego Progress in Fractional Differentiation and Applications 2 (2), 1-10, 2016 | 29 | 2016 |
| The k-fractional Hilfer derivative GA Dorrego, RA Cerutti Int. J. Math. Anal 7 (11), 543-550, 2013 | 27 | 2013 |
| k-Weyl fractional integral LG Romero, RA Cerutti, GA Dorrego Int. J. Math. Anal 6 (34), 1685-1691, 2012 | 20 | 2012 |
| A generalization of the kinetic equation using the Prabhakar-type operators GA Dorrego, D Kumar Honam Mathematical Journal 39 (3), 401-416, 2017 | 19 | 2017 |
| The Mittag–Leffler function and its application to the ultra-hyperbolic time-fractional diffusion-wave equation GA Dorrego Integral Transforms and Special Functions 27 (5), 392-404, 2016 | 6 | 2016 |
| Analytical solution of the generalized space-time fractional ultra-hyperbolic differential equation GA Dorrego Integral Transforms and Special Functions 33 (4), 264-275, 2022 | 1 | 2022 |
| Some Linear Fractional Differential Equations with Recurrence Relationship and Variable Coefficients LL Luque, RA Cerutti, GA Dorrego International Journal of Mathematical Analysis 16 (3), 97-113, 2022 | | 2022 |
| k-Generalized Space-Time Fractional Ultra-Hyperbolic Diffusion-Wave Equation with the Prabhakar Integral Operator GA Dorrego | | 2020 |
| Una generalización de las ecuaciones integrales de Abel GA Dorrego Universidad Nacional del Nordeste. Secretaría General de Ciencia y Técnica, 2014 | | 2014 |
| Ecuaciones integrales fraccionarias: su solución mediante la transformación de Laplace. RA Cerutti, GA Dorrego | | |
