Exceptional points for associated Legendre functions of the second kind

Abstract

We consider the complex plane structure of the associated Legendre function of the second kind Q-1/2-K(). We find that for any noninteger value for K Q-1/2-K() has an infinite number of poles in the complex plane, but for any negative integer K there are no poles at all. For K=0 or any positive integer K there is only a finite number of poles, with there only being one single pole (at =0) when K=0. This pattern is characteristic of the exceptional points that appear in a wide variety of physical contexts. However, unusually for theories with exceptional points, Q-1/2-K() has an infinite number of them. Other than in the PT-symmetry Jordan-block case, exceptional points usually occur at complex values of parameters. While not being Jordan-block exceptional points themselves, the exceptional points associated with the Q-1/2-K() nonetheless occur at real values of K.