Symbolic and numerical computation on Bessel functions of complex argument and large magnitude (Q2564285)

The author employs the Lanczos \(\tau\)-method with perturbations proportional to Faber polynomials to approximate the Bessel functions \(J_\nu(z)\), \(Y_\nu(z)\) and the Hankel functions \(H^{(1)}_\nu(z)\), \(H^{(2)}_\nu(z)\) for the outer region complement to a disk with given radius of the complex plane. It is shown via numerical experiments that the \(\tau\)-method achieves good approximation results for outer regions of the complex plane for \(J_0(z)\) and \(Y_0(z)\). The author also gives some remarks on open problems related to the topics considered in the paper.