Pages that link to "Item:Q2391879"

The following pages link to Numerical approximation of highly oscillatory integrals on semi-finite intervals by steepest descent method (Q2391879):

Displaying 11 items.

• Modified Gauss-Laguerre exponential fitting based formulae (Q334329) (← links)
• A remedy for the failure of the numerical steepest descent method on a class of oscillatory integrals (Q466798) (← links)
• Asymptotic analysis of numerical steepest descent with path approximations (Q604683) (← links)
• Implementing the complex integral method with the transformed Clenshaw-Curtis quadrature (Q902781) (← links)
• On the numerical approximation for Fourier-type highly oscillatory integrals with Gauss-type quadrature rules (Q1738082) (← links)
• A \(\bar{\partial}\)-steepest descent method for oscillatory Riemann-Hilbert problems (Q2062879) (← links)
• Exponentially-fitted Gauss-Laguerre quadrature rule for integrals over an unbounded interval (Q2252745) (← links)
• Computing highly oscillatory physical optics integral on the polygonal domain by an efficient numerical steepest descent path method (Q2449775) (← links)
• The modified composite Gauss type rules for singular integrals using Puiseux expansions (Q2826684) (← links)
• The steepest descent method for Fourier integrals involving algebraic and logarithmic singular factors (Q3175412) (← links)
• On the Evaluation of Highly Oscillatory Integrals by Analytic Continuation (Q3446829) (← links)