Abstract |
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This paper proposes the use of a global
collocation procedure in conjunction with a previously developed
functional set suitable for the numerical solution of
Poisson’s equation in rectangular domains. We propose to
expand the unknown variable in a bivariate series of monomials
xiyj that
exist in Pascal’s triangle. We also propose the use of the
bivariate Gordon–Coons interpolation, apart from previous
intuitive choices of the aforementioned monomials. The theory is
sustained by two numerical examples of Dirichlet boundary
conditions, in which we find that the approximate solution
monotonically converges towards the exact solution.
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Keywords
global collocation, Coons interpolation, Poisson's equation
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Authors
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