Fractional Calculus and Applied Analysis

Papers
(The H4-Index of Fractional Calculus and Applied Analysis is 19. The table below lists those papers that are above that threshold based on CrossRef citation counts [max. 250 papers]. The publications cover those that have been published in the past four years, i.e., from 2021-08-01 to 2025-08-01.)
ArticleCitations
Sonine-Dimovski transform and spectral synthesis associated with the hyper-Bessel operator on the complex plane41
Bounds for mixing times for finite semi-Markov processes with heavy-tail jump distribution39
Blow-up for a non-linear stable non-Gaussian process in fractional time31
Analysis of BURA and BURA-based approximations of fractional powers of sparse SPD matrices29
On generalized K-functionals in $$L_p$$ for $$0<p<1$$27
Asymptotically autonomous dynamics for fractional subcritical nonclassical diffusion equations driven by nonlinear colored noise27
Symmetry of solutions for asymptotically symmetric nonlocal parabolic equations27
Fractional differential equations of Bagley-Torvik and Langevin type26
Box dimension of mixed Katugampola fractional integral of two-dimensional continuous functions25
Differential transforms related to Caputo time-fractional derivatives and semigroups generated by fractional Schrödinger operators24
Considerations regarding the accuracy of fractional numerical computations24
Discrete fractional distributed Halanay inequality and applications in discrete fractional order neural network systems23
On heat equations associated with fractional harmonic oscillators21
Stochastic heat equation driven by space-only fractional Lévy noise20
Rigidity of phase transitions for the fractional elliptic Gross-Pitaevskii system20
Stability analysis of Hilfer fractional stochastic switched dynamical systems with non-Gaussian process and impulsive effects19
Multi-parametric Le Roy function revisited19
The Spatially Variant Fractional Laplacian19
Towards a Unified theory of Fractional and Nonlocal Vector Calculus19
A review of constitutive models for non-Newtonian fluids19
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