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 2021-11-01 to 2025-11-01.)
ArticleCitations
Sonine-Dimovski transform and spectral synthesis associated with the hyper-Bessel operator on the complex plane43
Bounds for mixing times for finite semi-Markov processes with heavy-tail jump distribution41
Blow-up for a non-linear stable non-Gaussian process in fractional time33
Analysis of BURA and BURA-based approximations of fractional powers of sparse SPD matrices32
On generalized K-functionals in $$L_p$$ for $$0<p<1$$30
Symmetry of solutions for asymptotically symmetric nonlocal parabolic equations28
Considerations regarding the accuracy of fractional numerical computations27
Stability analysis of Hilfer fractional stochastic switched dynamical systems with non-Gaussian process and impulsive effects27
Discrete fractional distributed Halanay inequality and applications in discrete fractional order neural network systems25
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
Stochastic heat equation driven by space-only fractional Lévy noise24
The Spatially Variant Fractional Laplacian24
On heat equations associated with fractional harmonic oscillators23
Rigidity of phase transitions for the fractional elliptic Gross-Pitaevskii system20
Asymptotically autonomous dynamics for fractional subcritical nonclassical diffusion equations driven by nonlinear colored noise20
A review of constitutive models for non-Newtonian fluids20
Fractional differential equations of Bagley-Torvik and Langevin type19
Fractional differential operators, fractional Sobolev spaces and fractional variation on homogeneous Carnot groups19
A Fractional Order Derivative Newton-Raphson Method for the Computation of the Power Flow Problem Solution in Energy Systems19
0.16671800613403