Product integration with the Clenshaw-Curtis points: Implementation and error estimates
From MaRDI portal
Publication:754598
DOI10.1007/BF01403676zbMath0416.65014MaRDI QIDQ754598
William E. Smith, Ian H. Sloan
Publication date: 1980
Published in: Numerische Mathematik (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/132680
error estimatesnumerical examplesproduct integrationClenshaw-Curtis pointspractical Chebyshev points
Related Items
Quadrature rules and asymptotic expansions for two classes of oscillatory Bessel integrals with singularities of algebraic or logarithmic type, On the evaluation of highly oscillatory finite Hankel transform using special functions, Numerical evaluation of a class of highly oscillatory integrals involving Airy functions, A high-order integral algorithm for highly singular PDE solutions in Lipschitz domains, Filon-Clenshaw-Curtis formulas for highly oscillatory integrals in the presence of stationary points, Extended product integration rules, Numerical calculation of integrals involving oscillatory and singular kernels and some applications of quadratures, Filon-Clenshaw-Curtis rules for a class of highly-oscillatory integrals with logarithmic singularities, A generalization of Filon-Clenshaw-Curtis quadrature for highly oscillatory integrals, Efficient methods for highly oscillatory integrals with weak and Cauchy singularities, High-order, Dispersionless “Fast-Hybrid” Wave Equation Solver. Part I: O(1) Sampling Cost via Incident-Field Windowing and Recentering, Efficient integration for a class of highly oscillatory integrals, Is hyperinterpolation efficient in the approximation of singular and oscillatory functions?, Mean Convergence of Interpolation at Zeros of Airy Functions, A comparison of some methods for the evaluation of highly oscillatory integrals, A truncated Clenshaw-Curtis formula approximates integrals over a semi-infinite interval, Some practical aspects in the numerical evaluation of cauchy principal value integrals, On fast and stable implementation of Clenshaw-Curtis and Fejér-type quadrature rules, On the numerical quadrature of weakly singular oscillatory integral and its fast implementation, Two algorithms for the construction of product formulas, Error bounds for approximation in Chebyshev points, Modified filon-Clenshaw-Curtis rules for oscillatory integrals with a nonlinear oscillator, A mixed scheme of product integration rules in \((-1,1)\), A polynomial interpolation process at quasi-Chebyshev nodes with the FFT, Numerical evaluation of integrals containing a spherical Bessel function by product integration, Error estimate for a corrected Clenshaw-Curtis quadrature rule
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- A method for numerical integration on an automatic computer
- Numerical solution of integral equations of mathematical physics, using Chebyshev polynomials
- Product-integration with the Clenshaw-Curtis and related points: Convergence properties
- The numerical solution of linear recurrence relations
- Clenshaw-Curtis quadrature with a weighting function
- The evaluation and application of some modified moments
- Error Estimation in the Clenshaw-Curtis Quadrature Formula
- Remarks on the Clenshaw-Curtis Quadrature Scheme
- An error analysis of Goertzel's (Watt's) method for computing Fourier coefficients
- Implementing Clenshaw-Curtis quadrature, I methodology and experience
- A numerical method for the integration of oscillatory functions
