Asymptotic relation for zeros of cross-product of Bessel functions and applications

Abstract

Let a,k be the k-th positive zero of the cross-product of Bessel functions J(R z) Y(z) - J(z) Y(R z), where ≥ 0 and R>1. We derive an initial value problem for a first order differential equation whose solution α(x) characterizes the limit behavior of a,k in the following sense: k ∞ akx,kk = α(x), x ≥ 0. Moreover, we show that a,k < π kR-1 + π 2R. We use α(x) to obtain an explicit expression of the Pleijel constant for planar annuli and compute some of its values.