Szegő–Lobatto quadrature rules |
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| Authors: | Carl Jagels Lothar Reichel |
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| Affiliation: | 1. Department of Mathematics and Computer Science, Hanover College, Hanover, IN 47243, USA;2. Department of Mathematical Sciences, Kent State University, Kent, OH 44242, USA |
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| Abstract: | Gauss-type quadrature rules with one or two prescribed nodes are well known and are commonly referred to as Gauss–Radau and Gauss–Lobatto quadrature rules, respectively. Efficient algorithms are available for their computation. Szeg? quadrature rules are analogs of Gauss quadrature rules for the integration of periodic functions; they integrate exactly trigonometric polynomials of as high degree as possible. Szeg? quadrature rules have a free parameter, which can be used to prescribe one node. This paper discusses an analog of Gauss–Lobatto rules, i.e., Szeg? quadrature rules with two prescribed nodes. We refer to these rules as Szeg?–Lobatto rules. Their properties as well as numerical methods for their computation are discussed. |
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| Keywords: | Gauss&ndash Szeg? quadrature rule Lobatto rule Periodic function Szeg? polynomial Szeg? quadrature rule |
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