Mathematics – Numerical Analysis
Scientific paper
2012-04-19
Mathematics
Numerical Analysis
29 pages
Scientific paper
The discrete Fourier analysis on the $30^{\degree}$-$60^{\degree}$-$90^{\degree}$ triangle is deduced from the corresponding results on the regular hexagon by considering functions invariant under the group $G_2$, which leads to the definition of four families generalized Chebyshev polynomials. The study of these polynomials lead to a Sturm-Liouville eigenvalue problem that contains two parameters, whose solutions are analogue of the Jacobi polynomials. Under a concept of $m$-degree and by introducing a new ordering among monomials, these polynomials are shown to share properties of the ordinary orthogonal polynomials. In particular, their common zeros generate cubature rules of Gauss type.
Li Huiyuan
Sun Jiachang
Xu Yuan
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