On the non‐differentiable exact solutions of the (2 + 1)‐dimensional local fractional breaking soliton equation on Cantor sets
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Publication:6182154
DOI10.1002/mma.8588zbMath1529.35116OpenAlexW4287877694MaRDI QIDQ6182154
Publication date: 21 December 2023
Published in: Mathematical Methods in the Applied Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/mma.8588
Cantor setslocal fractional derivativeMittag-Leffler function-based methodlocal fractional equations
Soliton equations (35Q51) Solutions to PDEs in closed form (35C05) Soliton solutions (35C08) Fractional partial differential equations (35R11)
Related Items (2)
Diverse soliton structures of the \((2+1)\)-dimensional nonlinear electrical transmission line equation ⋮ Abundant soliton structures to the \((2+1)\)-dimensional Heisenberg ferromagnetic spin chain dynamical model
Cites Work
- Unnamed Item
- Nonlinear dynamics for local fractional Burgers' equation arising in fractal flow
- Cantor-type cylindrical-coordinate method for differential equations with local fractional derivatives
- Local fractional similarity solution for the diffusion equation defined on Cantor sets
- Fractional order mathematical modeling of COVID-19 transmission
- An asymptotic perturbation solution for a linear oscillator of free damped vibrations in fractal medium described by local fractional derivatives
- Variational theory and new abundant solutions to the (1+2)-dimensional chiral nonlinear Schrödinger equation in optics
- Analytical expressions of amperometric enzyme kinetics pertaining to the substrate concentration using wavelets
- Fractional hydrodynamic equations for fractal media
- FRACTAL DIMENSIONS FOR MULTIPHASE FRACTAL MEDIA
- A study of the fractal foam drainage model in a microgravity space
- On new abundant solutions of the complex nonlinear Fokas–Lenells equation in optical fiber
- EXACT TRAVELING WAVE SOLUTIONS TO THE LOCAL FRACTIONAL (3 + 1)-DIMENSIONAL JIMBO–MIWA EQUATION ON CANTOR SETS
- INVESTIGATION TO THE LOCAL FRACTIONAL FOKAS SYSTEM ON CANTOR SET BY A NOVEL TECHNOLOGY
- A FRACTAL MODIFICATION OF THE SHARMA–TASSO–OLVER EQUATION AND ITS FRACTAL GENERALIZED VARIATIONAL PRINCIPLE
- APPLICATION OF THE EXTENDED F-EXPANSION METHOD FOR SOLVING THE FRACTIONAL GARDNER EQUATION WITH CONFORMABLE FRACTIONAL DERIVATIVE
- GENERALIZED VARIATIONAL PRINCIPLES AND NEW ABUNDANT WAVE STRUCTURES OF THE FRACTAL COUPLED BOUSSINESQ EQUATION
- SOLITARY WAVES OF THE FRACTAL REGULARIZED LONG-WAVE EQUATION TRAVELING ALONG AN UNSMOOTH BOUNDARY
- NOVEL APPROACH FOR FRACTAL NONLINEAR OSCILLATORS WITH DISCONTINUITIES BY FOURIER SERIES
- RESEARCH ON THE NONLINEAR VIBRATION OF CARBON NANOTUBE EMBEDDED IN FRACTAL MEDIUM
- FRACTAL SOLITARY WAVE SOLUTIONS FOR FRACTAL NONLINEAR DISPERSIVE BOUSSINESQ-LIKE MODELS
- A NEW PERSPECTIVE TO STUDY THE THIRD-ORDER MODIFIED KDV EQUATION ON FRACTAL SET
- On the (N+1)‐dimensional local fractional reduced differential transform method and its applications
- fPINNs: Fractional Physics-Informed Neural Networks
- ABUNDANT EXACT TRAVELING WAVE SOLUTIONS TO THE LOCAL FRACTIONAL (3+1)-DIMENSIONAL BOITI–LEON–MANNA–PEMPINELLI EQUATION
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