On the Sums of Inverse Even Powers of Zeros of Regular Bessel Functions

Abstract

We provide a new, simple general proof of the formulas giving the infinite sums σ(p,) of the inverse even powers 2p of the zeros k of the regular Bessel functions J(), as functions of . We also give and prove a general formula for certain linear combinations of these sums, which can be used to derive the formulas for σ(p,) by purely linear-algebraic means, in principle for arbitrarily large powers. We prove that these sums are always given by a ratio of two polynomials on , with integer coefficients. We complete the set of known formulas for the smaller values of p, extend it to p=9, and point out a connection with the Riemann zeta function, which allows us to calculate some of its values.