Add to ORKGWe introduce a version of the asymptotic expansions for Bessel functions Jν(z), Yν(z) that is valid whenever |z |> ν (which is deep in the Fresnel regime), as opposed to the standard expansions that are applicable only in the Fraunhofer regime (i.e. when |z |> ν2). As expected, in the Fraunhofer regime our asymptotics reduce to the classical ones. The approach is based on the observation that Bessel’s equation admits a non-oscillatory phase function, and uses classical formulae to obtain an asymptotic expansion for this function; this in turn leads to both an analytical tool and a numerical scheme for the efficient evaluation of Jν(z), Yν(z), as well as various related quantities. The effectiveness of the technique is demonstrated via...
For each non-negative constant p, the associated Bessel Equation is x2 d2y dx2 + x dy dx + (x2 − p2)...
AbstractGeneralized hypergeometric functions are used to extend, simplify, and complete the analysis...
textabstractAiry-type asymptotic representations of a class of special functions are considered from...
We introduce a version of the asymptotic expansions for Bessel functions $J_\nu(z)$, $Y_\nu...
AbstractIn the present paper we describe an algorithm for the evaluation of Bessel functions Jν(x), ...
We study a precise asymptotic behavior of the tail probability of the first hitting time of the Bess...
AbstractThe uniform asymptotic expansion of the modified Bessel function of the first kind lv(vz), e...
For the coefficients An(‘) and Bn(‘), that occur in the uniform asymptotic expansions of Bessel func...
ha-ee aptoved This document has been V for public release and sole; its djstLbution is unlimited. YA...
AbstractThe use of a uniform Airy-type asymptotic expansion for the computation of the modified Bess...
AbstractAsymptotic expansions of certain finite and infinite integrals involving products of two Bes...
This paper aims to provide a tutorial on Bessel functions, and especially on the numerical evaluatio...
The use of a uniform Airy-type asymptotic expansion for the computation of the modified Bessel funct...
The numerical evaluation of an individual Bessel or Hankel function of large order and large argumen...
AbstractFor the confluent hypergeometric functions U (a, b, z) and M (a, b, z) asymptotic expansions...
For each non-negative constant p, the associated Bessel Equation is x2 d2y dx2 + x dy dx + (x2 − p2)...
AbstractGeneralized hypergeometric functions are used to extend, simplify, and complete the analysis...
textabstractAiry-type asymptotic representations of a class of special functions are considered from...
We introduce a version of the asymptotic expansions for Bessel functions $J_\nu(z)$, $Y_\nu...
AbstractIn the present paper we describe an algorithm for the evaluation of Bessel functions Jν(x), ...
We study a precise asymptotic behavior of the tail probability of the first hitting time of the Bess...
AbstractThe uniform asymptotic expansion of the modified Bessel function of the first kind lv(vz), e...
For the coefficients An(‘) and Bn(‘), that occur in the uniform asymptotic expansions of Bessel func...
ha-ee aptoved This document has been V for public release and sole; its djstLbution is unlimited. YA...
AbstractThe use of a uniform Airy-type asymptotic expansion for the computation of the modified Bess...
AbstractAsymptotic expansions of certain finite and infinite integrals involving products of two Bes...
This paper aims to provide a tutorial on Bessel functions, and especially on the numerical evaluatio...
The use of a uniform Airy-type asymptotic expansion for the computation of the modified Bessel funct...
The numerical evaluation of an individual Bessel or Hankel function of large order and large argumen...
AbstractFor the confluent hypergeometric functions U (a, b, z) and M (a, b, z) asymptotic expansions...
For each non-negative constant p, the associated Bessel Equation is x2 d2y dx2 + x dy dx + (x2 − p2)...
AbstractGeneralized hypergeometric functions are used to extend, simplify, and complete the analysis...
textabstractAiry-type asymptotic representations of a class of special functions are considered from...