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Quadrature rules of Gaussian type for trigonometric polynomials with preassigned nodes
In this paper we consider Gaussian type quadrature rules for trigonometric polynomials where an even number of nodes is fixed in advance. For an integrable and nonnegative weight function w on the interval E=[a,a+2π), a∈R, these quadrature rules have the following form∫Et(x)w(x)dx=∑i=12kait(yi)+∑i=1...
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Published in: | Applied numerical mathematics 2024-06, Vol.200, p.399-408 |
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Main Authors: | , , |
Format: | Article |
Language: | English |
Subjects: | |
Citations: | Items that this one cites |
Online Access: | Get full text |
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Summary: | In this paper we consider Gaussian type quadrature rules for trigonometric polynomials where an even number of nodes is fixed in advance. For an integrable and nonnegative weight function w on the interval E=[a,a+2π), a∈R, these quadrature rules have the following form∫Et(x)w(x)dx=∑i=12kait(yi)+∑i=12(n+γ)Ait(xi),t∈T2(n+γ)+k−1, where the nodes yi∈E, i=1,2,…,2k, are fixed and prescribed in advance, γ∈{0,1/2} and Tn={coskx,sinkx|k=0,1,…,n}, n∈N.
Also, for γ=1/2, i.e., for the case of quadrature rules for trigonometric polynomials with odd number of nodes, we consider the optimal sets of quadrature rules in the sense of Borges (see [1,13]) for trigonometric polynomials with even number of fixed nodes. Let n=(n1,n2,…,nr), r∈N, be a multi-index and let W=(w1,w2,…,wr) be a system of weight functions on the interval E=[a,a+2π), a∈R. The optimal set of quadrature rules with respect to (W,n), with even number of fixed nodes, have the form∫Ef(x)wm(x)dx≈∑i=12kam,if(yi)+∑i=12|n|+1Am,if(xi),m=1,2,…r, where |n|=n1+n2+⋯+nr and the nodes yi∈E, i=1,2,…,2k, are fixed and prescribed in advance. For r=1 the optimal set of quadrature rules reduces to Gaussian quadrature rule for trigonometric polynomials with odd number of nodes.
For all mentioned quadrature rules, in addition to the theoretical results, we will present the method for construction and give appropriate numerical examples. |
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ISSN: | 0168-9274 1873-5460 |
DOI: | 10.1016/j.apnum.2023.05.015 |