A finite difference approach for the numerical solution of non-smooth problems for boundary value odes
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Publication:2229769
DOI10.1016/j.matcom.2012.07.015OpenAlexW2469271970WikidataQ62027846 ScholiaQ62027846MaRDI QIDQ2229769
Publication date: 18 February 2021
Published in: Mathematics and Computers in Simulation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.matcom.2012.07.015
biomechanicsfiber reinforced materialshigh order finite differencesmultipoint boundary values problems (BVPs)non-smooth ODEs
Cites Work
- Inhomogeneous shear of orthotropic incompressible non-linearly elastic solids: singular solutions and biomechanical interpretation
- Travelling waves in a reaction-diffusion model for electrodeposition
- High order generalized upwind schemes and numerical solution of singular perturbation problems
- Effective solution of discontinuous IVPs using a Runge-Kutta formula pair with interpolants
- One-step methods of any order for ordinary differential equations with discontinuous right-hand sides
- Singular boundary value problems for ODEs
- Event location for ordinary differential equations
- Numerical solution of singular boundary value problems via Chebyshev polynomial and B-spline
- High-order finite difference schemes for the solution of second-order BVPs
- Cubic spline for solving singular two-point boundary value problems
- Methods for solving singular boundary value problems using splines: a review
- A new high-order immersed interface method for solving elliptic equations with imbedded interface of discontinuity
- Numerical methods for nonsmooth dynamical systems. Applications in mechanics and electronics
- High order matched interface and boundary method for elliptic equations with discontinuous coefficients and singular sources
- A Mathematical Model for the Corrosion of Metallic Bipolar Plates in PEM Fuel Cells: Numerical and Experimental Issues
- Finite Difference Methods for Singular Two-Point Boundary Value Problems
- The Immersed Interface Method for Elliptic Equations with Discontinuous Coefficients and Singular Sources
- The Explicit-Jump Immersed Interface Method: Finite Difference Methods for PDEs with Piecewise Smooth Solutions
- Analysis of a New Error Estimate for Collocation Methods Applied to Singular Boundary Value Problems
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