A computational approach for solving fractional Volterra integral equations based on two-dimensional Haar wavelet method
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Publication:5093059
DOI10.1080/00207160.2021.1983549OpenAlexW3200858397MaRDI QIDQ5093059
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Publication date: 26 July 2022
Published in: International Journal of Computer Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00207160.2021.1983549
operational matrix (OM)two-dimensional fractional Volterra integral equations (2D-FVIEs)two-dimensional Haar wavelet (2D-HW)
Numerical methods for integral equations (65R20) Numerical methods for ill-posed problems for integral equations (65R30)
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- On Haar wavelet operational matrix of general order and its application for the numerical solution of fractional Bagley Torvik equation
- Numerical solution of two-dimensional weakly singular stochastic integral equations on non-rectangular domains via radial basis functions
- Multidimensional weakly singular integral equations
- Using rationalized Haar wavelet for solving linear integral equations
- Fractional calculus in viscoelasticity: an experimental study
- The couple of Hermite-based approach and Crank-Nicolson scheme to approximate the solution of two dimensional stochastic diffusion-wave equation of fractional order
- Solving fractional integral equations by the Haar wavelet method
- Haar wavelet operational matrix of fractional order integration and its applications in solving the fractional order differential equations
- Solving a class of two-dimensional linear and nonlinear Volterra integral equations by the differential transform method
- Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
- State analysis of linear time delayed systems via Haar wavelets
- A new approach to the numerical solution of weakly singular Volterra integral equations.
- Fractional relaxation processes and fractional rheological models for the description of a class of viscoelastic materials.
- Two-dimensional wavelets for numerical solution of integral equations
- Wavelets method for solving nonlinear stochastic Itô-Volterra integral equations
- Numerical solution of two-dimensional stochastic Fredholm integral equations on hypercube domains via meshfree approach
- Hybrid Taylor and block-pulse functions operational matrix algorithm and its application to obtain the approximate solution of stochastic evolution equation driven by fractional Brownian motion
- Explicit representation of orthonormal Bernoulli polynomials and its application for solving Volterra-Fredholm-Hammerstein integral equations
- A local mesh-less collocation method for solving a class of time-dependent fractional integral equations: 2D fractional evolution equation
- Numerical solution of time-varying functional differential equations via Haar wavelets
- Haar wavelet method for solving fractional partial differential equations numerically
- An operational Haar wavelet method for solving fractional Volterra integral equations
- Collocation methods for two dimensional weakly singular integral equations
- Haar wavelet method for solving lumped and distributed-parameter systems
- An Euler-type method for two-dimensional Volterra integral equations of the first kind
- Wavelets and Dilation Equations: A Brief Introduction
