Pages that link to "Item:Q2000630"
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The following pages link to Uniform approximation to finite Hilbert transform of oscillatory functions and its algorithm (Q2000630):
Displaying 21 items.
- Approximating the finite Hilbert transform via a companion of Ostrowski's inequality for function of bounded variation and applications (Q297736) (← links)
- Algorithms for approximating finite Hilbert transform with end-point singularities and its derivatives (Q645708) (← links)
- Approximation of the Hilbert transform via use of sinc convolution (Q871201) (← links)
- Uniform approximations to finite Hilbert transform and its derivative. (Q1427229) (← links)
- Efficient numerical methods for Cauchy principal value integrals with highly oscillatory integrands (Q2084261) (← links)
- Numerical methods for Cauchy principal value integrals of oscillatory Bessel functions (Q2122047) (← links)
- Interpolation based formulation of the oscillatory finite Hilbert transforms (Q2161616) (← links)
- Numerical approximations of highly oscillatory Hilbert transforms (Q2190876) (← links)
- Numerical steepest descent method for Hankel type of hypersingular oscillatory integrals in electromagnetic scattering problems (Q2244316) (← links)
- Investigations on the approximability and computability of the Hilbert transform with applications (Q2300755) (← links)
- Asymptotics and numerical approximation of highly oscillatory Hilbert transforms (Q2656734) (← links)
- APPROXIMATING THE FINITE HILBERT TRANSFORM VIA OSTROWSKI TYPE INEQUALITIES FOR ABSOLUTELY CONTINUOUS FUNCTIONS (Q4792601) (← links)
- Rational approximation, oscillatory Cauchy integrals, and Fourier transforms (Q5962917) (← links)
- Adaptive FCC+ rules for oscillatory integrals (Q6098969) (← links)
- Approximation of oscillatory Bessel integral transforms (Q6104252) (← links)
- Efficient computation of oscillatory Bessel transforms with a singularity of Cauchy type (Q6136548) (← links)
- Efficient computational methods of highly oscillatory Bessel transforms with a singular point of Cauchy type and a nonlinear special oscillator (Q6143091) (← links)
- Efficient numerical methods for hypersingular finite-part integrals with highly oscillatory integrands (Q6175207) (← links)
- Fast numerical integration of highly oscillatory Bessel transforms with a Cauchy type singular point and exotic oscillators (Q6500172) (← links)
- Approximation of the Hilbert transform in Hölder spaces (Q6612956) (← links)
- Numerical approximation of Volterra integral equations with highly oscillatory kernels (Q6618283) (← links)