Numerical Evaluation of Spherical Bessel Functions of the First Kind

The evaluation of the modified Bessel function of the third kind of purely imaginary order K ia (x) is discussed; we also present analogous results for the derivative. The methods are based on the use of Maclaurin series, nonoscillatory integral representations, asymptotic expansions, and a continue

A new formula for the product of the zeros of a Bessel function of the first kind of positive order, or the zeros of its nth derivative, where the value of n does not exceed the order of the Bessel function, is presented, together with an outline of its proof.  2002 Elsevier Science (USA)

The range of Fourier methods can be significantly increased by extending a nonperiodic function f (x) to a periodic function f on a larger interval. When f (x) is analytically known on the extended interval, the extension is straightforward. When f (x) is unknown outside the physical interval, there

Two-electron, four-center Coulomb integrals are undoubtedly the most difficult type involved in ab initio and density functional theory molecular structure calculations. Millions of such integrals are required for molecules of interest; therefore rapidity is the primordial criterion when the precisi