Exact solutions of the angular Teukolsky equation in particular cases

Abstract

In this work, we propose a new scheme to solve the angular Teukolsky equation for the particular case: m=0, s=0. We first transform this equation to a confluent Heun differential equation and then construct the Wronskian determinant to calculate the eigenvalues and normalized eigenfunctions. We find that the eigenvalues for larger l are approximately given by 0Al0 ≈ [l(l + 1) - τR2/2] - i\;τI2/2 with an arbitrary τ2=τR2 + i\,τI2. The angular probability distribution (APD) for the ground state moves towards the north and south poles for τR2>0, but aggregates to the equator for τR2≤0. However, we also notice that the APD for large angular momentum l always moves towards the north and south poles , regardless the choice of τ2.