Comparative Study of the Effect of Different Collocation Points on Legendre-Collocation Methods of solving Second-order Boundary Value Problems

Abstract: We seek to explore the effects of three basic types of Collocation points namely points at zeros of Legendre polynomials, equally-spaced points with boundary points inclusive and equally-spaced points with boundary point non-inclusive. Established in literature is the fact that type of collocation point influences to a large extent the results produced via collocation method (using orthogonal polynomials as basis function). We analyse the effect of these points on the accuracy of collocation method of solving … Show more

“…Partial derivatives are transformed into total derivatives as orthogonal polynomials are collocated at different domain points, letting the polynomials coefficients only single-variable-dependent. The roots of the orthogonal polynomial with higher degree are usually chosen as collocation points, mostly for its better performance and simpler solution [100] [101]. The larger the series of polynomials is (the higher degree of the last polynomial), the larger number of collocation points and hence, the less error in the solution and the higher computational cost.…”

“…A rigorous comparison between Jacobi, Hermite, Laguerre, Tchebycheff and Legendre polynomials (being those latter two special cases of Jacobi polynomials) was carried out to obtain the best results (see Annex II). Finally, a modified version of even Legendre polynomials proposed by Villadsen et al [100] and later by Finlayson [102], applied to 20 collocation points distributed throughout all the extractor length, namely the roots of the raised orthogonal polynomials [100] [101]. For this purpose, a change of variables was done to express the PDE system in terms of dimensionless variables that meet the orthogonal polynomials domain.…”

Use of mathematical methods in the resolution of chemical engineering problems

“…Partial derivatives are transformed into total derivatives as orthogonal polynomials are collocated at different domain points, letting the polynomials coefficients only single-variable-dependent. The roots of the orthogonal polynomial with higher degree are usually chosen as collocation points, mostly for its better performance and simpler solution [100] [101]. The larger the series of polynomials is (the higher degree of the last polynomial), the larger number of collocation points and hence, the less error in the solution and the higher computational cost.…”

“…A rigorous comparison between Jacobi, Hermite, Laguerre, Tchebycheff and Legendre polynomials (being those latter two special cases of Jacobi polynomials) was carried out to obtain the best results (see Annex II). Finally, a modified version of even Legendre polynomials proposed by Villadsen et al [100] and later by Finlayson [102], applied to 20 collocation points distributed throughout all the extractor length, namely the roots of the raised orthogonal polynomials [100] [101]. For this purpose, a change of variables was done to express the PDE system in terms of dimensionless variables that meet the orthogonal polynomials domain.…”

Use of mathematical methods in the resolution of chemical engineering problems

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