The method of approximate fundamental solutions (MAFS) for Stefan problems
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Publication:444836
DOI10.1016/J.ENGANABOUND.2011.08.007zbMath1245.80006OpenAlexW1973160520MaRDI QIDQ444836
Publication date: 24 August 2012
Published in: Engineering Analysis with Boundary Elements (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.enganabound.2011.08.007
Stefan problems, phase changes, etc. (80A22) Fundamental solutions, Green's function methods, etc. for initial value and initial-boundary value problems involving PDEs (65M80)
Cites Work
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- The method of fundamental solutions for free surface Stefan problems
- Meshless collocation method by delta-shaped basis functions for default barrier model
- A Trefftz type method for time-dependent problems
- Finite-difference methods with increased accuracy and correct initialization for one-dimensional Stefan problems
- The numerical solution of one-phase classical Stefan problem
- A numerical solution of the Stefan problem with a Neumann-type boundary condition by enthalpy method.
- Finite difference solution of one-dimensional Stefan problem with periodic boundary conditions.
- Spherical solidification by the enthalpy method and the heat balance integral method
- A boundary method of Trefftz type for PDEs with scattered data
- A comparison of numerical models for one-dimensional Stefan problems
- Starting solutions for the boundary immobilization method
- A basis function for approximation and the solutions of partial differential equations
- A computational method for inverse free boundary determination problem
- A boundary meshless method using Chebyshev interpolation and trigonometric basis function for solving heat conduction problems
- A Comparative Study of Numerical Methods for Moving Boundary Problems
- A Nodal Method for Phase Change Moving Boundary Problems
- A computationally efficient solution technique for moving-boundary problems in finite media
- Numerical methods for one-dimensional Stefan problems
- Application of Standard and Refined Heat Balance Integral Methods to One-Dimensional Stefan Problems
- Approximation of multivariate functions and evaluation of particular solutions using Chebyshev polynomial and trigonometric basis functions
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