Works matching IS 13110454 AND DT 2025 AND VI 28 AND IP 1
Results: 19
Existence and approximate controllability of Hilfer fractional impulsive evolution equations: Existence and approximate controllability...: K. Qiu et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 146, doi. 10.1007/s13540-025-00372-x
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An improved fractional predictor-corrector method for nonlinear fractional differential equations with initial singularity: An improved fractional predictor-corrector method...: J. Huang et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 453, doi. 10.1007/s13540-025-00371-y
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The quasi-reversibility method for recovering a source in a fractional evolution equation: The quasi-reversibility method for recovering a...: L. Sun et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 473, doi. 10.1007/s13540-025-00370-z
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Continuity of solutions for tempered fractional general diffusion equations driven by TFBM: Continuity of solutions for tempered...: L. J. Zhang, Y. J. Wang.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 411, doi. 10.1007/s13540-024-00369-y
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Mixed slow-fast stochastic differential equations: Averaging principle result: Mixed slow-fast stochastic differential equations: S. Liu.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 181, doi. 10.1007/s13540-024-00368-z
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Global solvability of inverse coefficient problem for one fractional diffusion equation with initial non-local and integral overdetermination conditions: Global solvability of inverse coefficient problem for...: D. Durdiev, A. Rahmonov.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 117, doi. 10.1007/s13540-024-00367-0
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Existence and uniqueness of discrete weighted pseudo S-asymptotically ω-periodic solution to abstract semilinear superdiffusive difference equation: Discrete weighted pseudo S-asymptotically ω-periodic solution: J. González-Camus.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 430, doi. 10.1007/s13540-024-00366-1
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On boundary value problem of the nonlinear fractional partial integro-differential equation via inverse operators: On boundary value problem of the...: C. Li.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 386, doi. 10.1007/s13540-024-00365-2
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Asymptotic cycles in fractional generalizations of multidimensional maps: Asymptotic cycles in fractional...: M. Edelman.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 24, doi. 10.1007/s13540-024-00364-3
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A time-space fractional parabolic type problem: weak, strong and classical solutions.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 93, doi. 10.1007/s13540-024-00363-4
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Hardy–Hénon fractional equation with nonlinearities involving exponential critical growth: Hardy–Hénon fractional equation...: E. M. Barboza et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 307, doi. 10.1007/s13540-024-00361-6
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Study on the diffusion fractional m-Laplacian with singular potential term: Study on the diffusion fractional m-Laplacian...: W.-S. Yuan et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 346, doi. 10.1007/s13540-024-00360-7
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On a mixed partial Caputo derivative and its applications to a hyperbolic partial fractional differential equation: On a mixed partial Caputo derivative...: R. Kamocki, C. Obczyński.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 1, doi. 10.1007/s13540-024-00358-1
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Appell system associated with the infinite dimensional Fractional Pascal measure: Appell system associated with the infinite...: A. Riahi et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 364, doi. 10.1007/s13540-024-00357-2
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A collection of correct fractional calculus for discontinuous functions: A collection of correct fractional...: T. Feng , Y.Q. Chen.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 76, doi. 10.1007/s13540-024-00356-3
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Spatial β-fractional output stabilization of bilinear systems with a time α-fractional-order: Spatial β-fractional output...: M. Benoudi, R. Larhrissi.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 208, doi. 10.1007/s13540-024-00354-5
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Global existence, uniqueness and L∞-bound of weak solutions of fractional time-space Keller-Segel system: Global existence, uniqueness and L∞...: F. Gao et al.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 232, doi. 10.1007/s13540-024-00353-6
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A semilinear diffusion PDE with variable order time-fractional Caputo derivative subject to homogeneous Dirichlet boundary conditions: A semilinear diffusion PDE with variable...: M. Slodička.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 38, doi. 10.1007/s13540-024-00352-7
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A definition of fractional k-dimensional measure: bridging the gap between fractional length and fractional area: A definition of fractional k...: C. Mihaila, B. Seguin.
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- Fractional Calculus & Applied Analysis, 2025, v. 28, n. 1, p. 276, doi. 10.1007/s13540-024-00351-8
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