Bound States of Non-Hermitian Quantum Field Theories
Abstract
The spectrum of the Hermitian Hamiltonian 12p2+12m2x2+gx4 (g>0), which describes the quantum anharmonic oscillator, is real and positive. The non-Hermitian quantum-mechanical Hamiltonian H=12p2+1 2m2x2-gx4, where the coupling constant g is real and positive, is PT-symmetric. As a consequence, the spectrum of H is known to be real and positive as well. Here, it is shown that there is a significant difference between these two theories: When g is sufficiently small, the latter Hamiltonian exhibits a two-particle bound state while the former does not. The bound state persists in the corresponding non-Hermitian PT-symmetric -gφ4 quantum field theory for all dimensions 0≤ D<3 but is not present in the conventional Hermitian gφ4 field theory.
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