Two-Point Green's Function in PT-Symmetric Theories
Abstract
The Hamiltonian H=12 p2+12m2x2+gx2(ix)δ with δ,g≥0 is non-Hermitian, but the energy levels are real and positive as a consequence of PT symmetry. The quantum mechanical theory described by H is treated as a one-dimensional Euclidean quantum field theory. The two-point Green's function for this theory is investigated using perturbative and numerical techniques. The K\"allen-Lehmann representation for the Green's function is constructed, and it is shown that by virtue of PT symmetry the Green's function is entirely real. While the wave-function renormalization constant Z cannot be interpreted as a conventional probability, it still obeys a normalization determined by the commutation relations of the field. This provides strong evidence that the eigenfunctions of the Hamiltonian are complete.
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