Conjecture on the analyticity of PT-symmetric potentials and the reality of their spectra

Abstract

The spectrum of the Hermitian Hamiltonian H=p2+V(x) is real and discrete if the potential V(x)∞ as x∞. However, if V(x) is complex and PT-symmetric, it is conjectured that, except in rare special cases, V(x) must be analytic in order to have a real spectrum. This conjecture is demonstrated by using the potential V(x)=(ix)a|x|b, where a,b are real.