AbstractThis paper develops four near-minimax rational approximation formulas for computing the positive zeros js, s = 1,2,… of the Bessel function J0(x). Discrete best approximation techniques are used in each case to numerically determine the coefficients for the rational function that minimizes the maximum relative error over the discrete domain s = 1,2,…. These coefficients are then replaced by nearby rational numbers to obtain a convenient near-minimax approximation formula. Each of the resulting four approximations can be used to accurately compute j, for any s ⩾ 1. The maximum relative error for the four rational functions we develop range from 2.2 × 10−4 for the first approximation, down to 1.6 × 10−15 for the fourth approximation
We describe a method for the rapid numerical evaluation of the Bessel functions of the first and sec...
AbstractThe present article is concerned with lower and upper bounds of the first positive zero of t...
AbstractThe first positive zero jv,1 of the Bessel function jv(x) has the asymptotic expansion jv,1=...
AbstractThis paper develops four near-minimax rational approximation formulas for computing the posi...
AbstractWe present rational approximations of the Bessel functions Jv(x), v=0,1,…,10, which can be u...
Precise and straightforward analytic approximations for the Bessel function J1(x) have been found. P...
© 2019, Pleiades Publishing, Ltd. Algorithms for fast computations of the Bessel functions of an int...
AbstractWe consider computing a prescribed number of smallest positive zeros of Bessel functions and...
AbstractWe derive rational approximations for the zeros of a selection of Bessel, Airy and Kelvin fu...
The Bessel functions are considered relatively difficult to compute. Although they have a simple pow...
AbstractAn upper bound for the first positive zero of the Bessel functions of first kind Jμ(z) for μ...
The paper deals with the relation between global rational approximation and local approximation off ...
This study examines the various considerations which are made when a function is approximated by a r...
AbstractThis note is concerned with the approximation of cosh √x on [0, 1] by polynomials having onl...
nag_bessel_j_alpha (s18ekc) nag_bessel_j_alpha (s18ekc) returns a sequence of values for the Bessel ...
We describe a method for the rapid numerical evaluation of the Bessel functions of the first and sec...
AbstractThe present article is concerned with lower and upper bounds of the first positive zero of t...
AbstractThe first positive zero jv,1 of the Bessel function jv(x) has the asymptotic expansion jv,1=...
AbstractThis paper develops four near-minimax rational approximation formulas for computing the posi...
AbstractWe present rational approximations of the Bessel functions Jv(x), v=0,1,…,10, which can be u...
Precise and straightforward analytic approximations for the Bessel function J1(x) have been found. P...
© 2019, Pleiades Publishing, Ltd. Algorithms for fast computations of the Bessel functions of an int...
AbstractWe consider computing a prescribed number of smallest positive zeros of Bessel functions and...
AbstractWe derive rational approximations for the zeros of a selection of Bessel, Airy and Kelvin fu...
The Bessel functions are considered relatively difficult to compute. Although they have a simple pow...
AbstractAn upper bound for the first positive zero of the Bessel functions of first kind Jμ(z) for μ...
The paper deals with the relation between global rational approximation and local approximation off ...
This study examines the various considerations which are made when a function is approximated by a r...
AbstractThis note is concerned with the approximation of cosh √x on [0, 1] by polynomials having onl...
nag_bessel_j_alpha (s18ekc) nag_bessel_j_alpha (s18ekc) returns a sequence of values for the Bessel ...
We describe a method for the rapid numerical evaluation of the Bessel functions of the first and sec...
AbstractThe present article is concerned with lower and upper bounds of the first positive zero of t...
AbstractThe first positive zero jv,1 of the Bessel function jv(x) has the asymptotic expansion jv,1=...