Pages that link to "Item:Q2423075"

The following pages link to A rational approximation of the Dawson's integral for efficient computation of the complex error function (Q2423075):

Displaying 11 items.

• Sampling by incomplete cosine expansion of the sinc function: application to the Voigt/complex error function (Q300103) (← links)
• Efficient algorithmic implementation of the Voigt/complex error function based on exponential series approximation (Q654661) (← links)
• Constrained near-minimax rational approximations to Dawson's integral (Q1126680) (← links)
• Shifted rectangular quadrature rule approximations to Dawson's integral \(F(x)\) (Q1298502) (← links)
• A sampling-based approximation of the complex error function and its implementation without poles (Q1748065) (← links)
• Analytical and asymptotic evaluations of Dawson's integral and related functions in mathematical physics (Q2292432) (← links)
• Evaluating of Dawson's integral by solving its differential equation using orthogonal rational Chebyshev functions (Q2518674) (← links)
• Gaussian dispersion analysis in the time domain: efficient conversion with Padé approximants (Q2700743) (← links)
• Various results for series expansions of the error functions with the complex variable and some of their implications (Q5099746) (← links)
• Computation of the Complex Error Function Using Modified Trapezoidal Rules (Q5157400) (← links)
• Efficient multiple-precision computation of the scaled complementary error function and the Dawson integral (Q6200839) (← links)