Parity-Time Symmetric Spin-1/2 Richardson-Gaudin Models

Abstract

We construct a PT-symmetric Richardson--Gaudin models for spin-12 systems by deforming the closed integrable Hamiltonian through complex-valued transverse magnetic fields and coupling constants. By defining parity as P = Πi σiz and adopting a time-reversal operator that flips only the y-component of spin, we establish a consistent PT-symmetric framework distinct from open-system approaches based on Lindblad dynamics. The resulting model remains integrable, with conserved charges satisfying generalized commutativity conditions. We explicitly construct the Hermitian counterpart via a similarity transformation and identify the metric operator = e-Σi qi Siz that defines the physical inner product. Numerical diagonalization reveals the characteristic PT spectral structure: eigenvalues are either real or form complex conjugate pairs, with partial symmetry breaking wherein low-energy states remain in the unbroken phase. We further derive exact analytical expressions for spin dynamics, showing coherent oscillations in the unbroken phase and exponentially modulated behavior in the broken phase.