Bound states, scattering states and resonant states in PT-symmetric open quantum systems

TL;DR

This paper investigates PT-symmetric open quantum systems, revealing phenomena like resonance in continuum, exceptional points, and quasi-bound states, with implications for experimental observation and novel scattering properties.

Contribution

It introduces a comprehensive analysis of PT-symmetric open quantum systems, including the characterization of RIC, EPs, QBICs, and PT-symmetric scattering states, advancing understanding of their spectral and scattering features.

Findings

Resonance in continuum (RIC) appears in both discrete and scattering spectra.

Exceptional points (EPs) are categorized as EP2A and EP2B, with EP2As linked to PT-symmetry breaking.

Spatially localized complex solutions can form quasi-bound states in continuum (QBICs).

Abstract

We study a simple open quantum system with a PT-symmetric defect potential as a prototype to illustrate general features of PT-symmetric open quantum systems; however, the potential could be mimicked by a number of recent PT experiments. One key feature is the resonance in continuum (RIC), which appears in both the discrete spectrum and scattering spectrum. The RIC forms a standing wave extending throughout the spatial extent of the system, representing a resonance between the open environment and the central PT-symmetric potential. We illustrate that as one deforms the system parameters, the RIC may exit the continuum by splitting into a bound state and a virtual bound state at the band edge, a process that should be experimentally observable. We also study the exceptional points (EPs) at which two eigenvalues coalesce; we categorize these as either EP2As, at which two real-valued solutions coalesce before becoming complex-valued, or EP2Bs, for which the two solutions are complex on either side of the EP. The EP2As are associated with PT-symmetry breaking; we argue that these are more stable against parameter perturbation than the EP2Bs. We also study complex-valued solutions of the discrete spectrum for which the wave function is nevertheless spatially localized, something not allowed in traditional open quantum systems; we illustrate that these may form quasi-bound states in continuum (QBICs) under some circumstances. We also study the scattering properties of the system, including states that support invisible propagation and some general features of perfect transmission states. We finally construct scattering states that satisfy PT-symmetric boundary conditions; while these states do not conserve the traditional probability current, we introduce the PT-current that is preserved. The perfect transmission states appear as a special case of the PT-symmetric scattering states.