Vieira, N.Rodrigues, M. M.Ferreira, M.2023-04-112023-04-112023-03Vieira, N., Rodrigues, M. M., & Ferreira, M. (2023). Fractional Gradient Methods via ψ-Hilfer Derivative. Fractal and Fractional, 7(3), 275. https://doi.org/10.3390/fractalfract7030275275http://hdl.handle.net/10400.8/8358The final version is published in Fractal and Fractional, 7-No.3, (2023), Article No.275 (30pp.). It as available via the website https://www.mdpi.com/2504-3110/7/3/275Acknowledgements: The work of the authors was supported by Portuguese funds through CIDMA–Center for Research and Development in Mathematics and Applications, and FCT–Fundação para a Ciência e a Tecnologia, within projects UIDB/04106/2020 and UIDP/04106/2020. N. Vieira was also supported by FCT via the 2018 FCT program of Stimulus of Scientific Employment - Individual Support (Ref: CEECIND/01131/2018).Motivated by the increasing of practical applications in fractional calculus, we study the classical gradient method under the perspective of the ψ-Hilfer derivative. This allows us to cover in our study several definitions of fractional derivatives that are found in the literature. The convergence of the ψ-Hilfer continuous fractional gradient method is studied both for strongly and non-strongly convex cases. Using a series representation of the target function, we develop an algorithm for the ψ-Hilfer fractional order gradient method. The numerical method obtained by truncating higher-order terms was tested and analyzed using benchmark functions. Considering variable order differentiation and optimizing the step size, the ψ-Hilfer fractional gradient method shows better results in terms of speed and accuracy. Our results generalize previous works in the literature.engFractional calculusψ-Hilfer fractional derivativeFractional Gradient methodOptimizationjournal articlehttps://doi.org/10.3390/fractalfract70302752504-3110