Pages that link to "Item:Q2286024"

The following pages link to Efficient methods for highly oscillatory integrals with weakly singular and hypersingular kernels (Q2286024):

Displaying 15 items.

• A unified approach with spectral convergence for the evaluation of hypersingular and supersingular integrals with a periodic kernel (Q1931460) (← links)
• On the numerical quadrature of weakly singular oscillatory integral and its fast implementation (Q1990418) (← links)
• Clenshaw-Curtis-type quadrature rule for hypersingular integrals with highly oscillatory kernels (Q2007678) (← links)
• Efficient numerical methods for Cauchy principal value integrals with highly oscillatory integrands (Q2084261) (← links)
• Efficient and accurate quadrature methods of Fourier integrals with a special oscillator and weak singularities (Q2101906) (← links)
• Numerical methods for Cauchy principal value integrals of oscillatory Bessel functions (Q2122047) (← links)
• Efficient algorithms for integrals with highly oscillatory Hankel kernels (Q2143525) (← links)
• Efficient computation of highly oscillatory Fourier-type integrals with monomial phase functions and Jacobi-type singularities (Q2301297) (← links)
• Asymptotics and numerical approximation of highly oscillatory Hilbert transforms (Q2656734) (← links)
• An efficient quadrature rule for weakly and strongly singular integrals (Q2698209) (← links)
• Efficient computation of highly oscillatory integrals with weak singularities by Gauss-type method (Q2804868) (← links)
• Efficient methods for highly oscillatory integrals with weak and Cauchy singularities (Q2957744) (← links)
• Efficient computation of oscillatory Bessel transforms with a singularity of Cauchy type (Q6136548) (← links)
• Efficient numerical methods for hypersingular finite-part integrals with highly oscillatory integrands (Q6175207) (← links)
• Numerical calculation of regular and singular integrals in boundary integral equations using Clenshaw-Curtis quadrature rules (Q6539828) (← links)