Semi-relativistic wave-phase approximation for two-body spinless bound states in 1+1 dimensions

Abstract

An approximate quantum-mechanical two-body equation for spinless particles incorporating relativistic kinematics is derived. The derivation is based on the relativistic energy-momentum relation mc2+ε = m2c4+p2c2+V for each single particle, where mc2 is the particle rest mass energy, p its linear momentum, ε its dynamical energy, and V being the time-like vector interaction potential. The resulting two-body equation assumes rapid wave oscillations in a single, slowly varying potential well. A Bohr-Sommerfeld-type quantization condition is obtained. The approximation is compared to exact results for the harmonic potential.