Collocation methods for nonlinear Volterra integral equations with oscillatory kernel
From MaRDI portal
Publication:6577598
DOI10.1016/J.APNUM.2024.05.002zbMATH Open1543.6521MaRDI QIDQ6577598
Leila Moradi, H. Podhaisky, Dajana Conte, Beatrice Paternoster
Publication date: 24 July 2024
Published in: Applied Numerical Mathematics (Search for Journal in Brave)
convergence analysiscollocation methodsnonlinear Volterra integral equationshighly oscillatory kernel
Numerical methods for integral equations (65R20) Numerical quadrature and cubature formulas (65D32) Volterra integral equations (45D05)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- On Volterra integral operators with highly oscillatory kernels
- A rapid solution of a kind of 1D Fredholm oscillatory integral equation
- High order exponentially fitted methods for Volterra integral equations with periodic solution
- On the convergence of collocation solutions in continuous piecewise polynomial spaces for Volterra integral equations
- Efficient Filon-type methods for \(\int_a^b f(x)\,e^{i\omega g(x)}\, dx\)
- Stability of linear multistep methods for delay integro-differential equations
- Stability of Runge-Kutta-Pouzet methods for Volterra integro-differential equations with delays
- Spectral methods for weakly singular Volterra integral equations with smooth solutions
- On mixed collocation methods for Volterra integral equations with periodic solution
- A generalization of Filon-Clenshaw-Curtis quadrature for highly oscillatory integrals
- A collocation boundary value method for linear Volterra integral equations
- Efficient methods for Volterra integral equations with highly oscillatory Bessel kernels
- Efficient collocation methods for Volterra integral equations with highly oscillatory kernel
- Exponential fitting collocation methods for a class of Volterra integral equations
- Volterra Integral Equations
- Asymptotic expansion and Filon-type methods for a Volterra integral equation with a highly oscillatory kernel
- Clenshaw-Curtis-Filon-type methods for highly oscillatory Bessel transforms and applications
- On the Evaluation of Highly Oscillatory Integrals by Analytic Continuation
- Procedures for Computing One- and Two-Dimensional Integrals of Functions with Rapid Irregular Oscillations
- Computing highly oscillatory integrals
- Computing Highly Oscillatory Integrals
- Collocation Methods for Volterra Integral and Related Functional Differential Equations
- Efficient quadrature of highly oscillatory integrals using derivatives
- Moment-free numerical integration of highly oscillatory functions
- A Chebyshev collocation method for a class of Fredholm integral equations with highly oscillatory kernels
This page was built for publication: Collocation methods for nonlinear Volterra integral equations with oscillatory kernel
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6577598)
