Four easy pieces

Abstract

This paper is a mini-summary of four new advances in the theory of -symmetric quantum mechanics. It describes some new calculations that were completed in 2005. The first advance concerns the classical coordinate-space trajectories in some -symmetric theories. Depending on the initial conditions, one can find arbitrarily long periodic -symmetric classical trajectories. The longer trajectories originate from smaller regions of initial conditions. There is an interesting resemblance to the so-called period-doubling route to chaos. The second advance concerns the perturbative construction of the operator for a -symmetric square well. The result has notable similarities to and differences from that for the -symmetric cubic oscillator. The third advance is a detailed comparison of a -symmetric Hamiltonian and the corresponding Hermitian Hamiltonian. It is argued that a perturbative construction of the Hermitian Hamiltonian leads to an almost intractable theory. The fourth advance concerns reflectionless potentials and symmetry and a possible connection with problems in cosmology. © 2006 IOP Publishing Ltd.