A Haar wavelet collocation approach for solving one and two‐dimensional second‐order linear and nonlinear hyperbolic telegraph equations
From MaRDI portal
Publication:6088433
DOI10.1002/num.22512OpenAlexW3047072983MaRDI QIDQ6088433
No author found.
Publication date: 14 December 2023
Published in: Numerical Methods for Partial Differential Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/num.22512
Related Items
A modified algorithm based on Haar wavelets for the numerical simulation of interface models ⋮ Efficient numerical algorithm for the solution of eight order boundary value problems by Haar wavelet method ⋮ Advanced shifted sixth-kind Chebyshev tau approach for solving linear one-dimensional hyperbolic telegraph type problem ⋮ A hybrid reptile search algorithm and Levenberg-Marquardt algorithm based Haar wavelets to solve regular and singular boundary value problems
Cites Work
- Unnamed Item
- A numerical study of two dimensional hyperbolic telegraph equation by modified B-spline differential quadrature method
- A differential quadrature algorithm to solve the two dimensional linear hyperbolic telegraph equation with Dirichlet and Neumann boundary conditions
- Solution of the second-order one-dimensional hyperbolic telegraph equation by using the dual reciprocity boundary integral equation (DRBIE) method
- A Taylor matrix method for the solution of a two-dimensional linear hyperbolic equation
- Numerical solution of telegraph equation using interpolating scaling functions
- Numerical solution of first kind Fredholm integral equations with wavelets-Galerkin method (WGM) and wavelets precondition
- Unconditionally stable difference schemes for a one-space-dimensional linear hyperbolic equation
- Invariants of two- and three-dimensional hyperbolic equations
- Singularly perturbed telegraph equations with applications in the random walk theory
- A Galerkin-like scheme to solve two-dimensional telegraph equation using collocation points in initial and boundary conditions
- Application of Bernoulli matrix method for solving two-dimensional hyperbolic telegraph equations with Dirichlet boundary conditions
- Representation of differential operators in wavelet basis
- A wavelet-based method for numerical solution of nonlinear evolution equations
- A complex valued approach to the solutions of Riemann-Liouville integral, Atangana-Baleanu integral operator and non-linear telegraph equation via fixed point method
- A new solution procedure for the nonlinear telegraph equation
- Numerical solution of a class of delay differential and delay partial differential equations via Haar wavelet
- A numerical algorithm for the solution of telegraph equations
- A new fourth-order compact finite difference scheme for the two-dimensional second-order hyperbolic equation
- A wavelet operational method for solving fractional partial differential equations numerically
- Haar wavelet collocation method for three-dimensional elliptic partial differential equations
- An unconditionally stable alternating direction implicit scheme for the two space dimensional linear hyperbolic equation
- A method based on meshless approach for the numerical solution of the two-space dimensional hyperbolic telegraph equation
- A numerical method for solving the hyperbolic telegraph equation
- Numerical solution of nonlinear system of second-order boundary value problems using cubic B-spline scaling functions
- Wave splitting of the telegraph equation in R 3 and its application to inverse scattering
- High order implicit collocation method for the solution of two‐dimensional linear hyperbolic equation
