Modified homotopy perturbation method and approximate solutions to a class of local fractional integrodifferential equations
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Publication:2682586
DOI10.1155/2022/7087481OpenAlexW4293332283MaRDI QIDQ2682586
Publication date: 1 February 2023
Published in: Advances in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2022/7087481
Cites Work
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- Influence of hierarchic structure on the moisture permeability of biomimic woven fabric using fractal derivative method
- Fractional sub-equation method and its applications to nonlinear fractional PDEs
- Variational iteration method for solving integro-differential equations
- Comparison between the homotopy perturbation method and the sine-cosine wavelet method for solving linear integro-differential equations
- Homotopy perturbation technique
- On the stability, integrability and boundedness analyses of systems of integro-differential equations with time-delay retardation
- Qualitative analysis of Caputo fractional integro-differential equations with constant delays
- Line soliton interactions for shallow ocean waves and novel solutions with peakon, ring, conical, columnar, and lump structures based on fractional KP equation
- Approximation solutions for local fractional Schrödinger equation in the one-dimensional Cantorian system
- On the representation of fractional Brownian motion as an integral with respect to \((dt)^a\)
- Variable separation method for nonlinear time fractional biological population model
- Exact Solutions of Fractional-Order Biological Population Model
- Fractional differentiability of nowhere differentiable functions and dimensions
- The Finite Difference Methods for Fractional Ordinary Differential Equations
- STUDY OF NONLINEAR HIROTA–SATSUMA COUPLED KdV AND COUPLED mKdV SYSTEM WITH TIME FRACTIONAL DERIVATIVE
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