Abstract In this paper, an integral collocation approach based on Chebyshev polynomials for numerically solving biharmonic equations [N. Mai-Duy, R.I. Tanner, A spectral collocation method based on integrated Chebyshev polynomials for biharmonic boundary-value problems, J. Comput. Appl. Math. 201 (1) (2007) 30–47] is further developed for the case of irregularly shaped domains. The problem domain is embedded in a domain of regular shape, which facilitates the use of tensor product grids. Two relevant important issues, namely the description of the boundary of the domain on a tensor product grid and the imposition of double boundary conditions, are handled effectively by means of integration constants. Several schemes of the integral collocation formulation are proposed, and their performances are numerically investigated through the interpolation of a function and the solution of 1D and 2D biharmonic problems. Results obtained show that they yield spectral accuracy.
[1]
Nam Mai-Duy,et al.
A spectral collocation method based on integrated Chebyshev polynomials for two-dimensional biharmonic boundary-value problems
,
2007
.
[2]
L. Trefethen.
Spectral Methods in MATLAB
,
2000
.
[3]
S. Orszag.
Spectral methods for problems in complex geometries
,
1980
.
[4]
D. Gottlieb,et al.
Numerical analysis of spectral methods : theory and applications
,
1977
.
[5]
R. Glowinski,et al.
Distributed Lagrange multipliers based on fictitious domain method for second order elliptic problems
,
2007
.
[6]
Bengt Fornberg,et al.
A practical guide to pseudospectral methods: Introduction
,
1996
.