Spectrum of the semi-relativistic Pauli-Fierz model I

Abstract

HVZ type theorem for semi-relativistic Pauli-Fierz Hamiltonian, =(p -A)2+M2+V + , M≥ 0, in quantum electrodynamics is studied. Here H is a self-adjoint operator in Hilbert space ∫d dx, and A=∫d A(x) dx a quantized radiation field and the free field Hamiltonian defined by the second quantization of a dispersion relation ω:d . It is emphasized that massless case, M=0, is included. Let E=∈f σ () be the bottom of the spectrum of . Suppose that the infimum of ω is m>0. Then it is shown that σ ess()=[E+m, ∞). In particular the existence of the ground state of can be proven.