Klein-Gordon lower bound to the semirelativistic ground-state energy

Abstract

For the class of attractive potentials V(r) <= 0 which vanish at infinity, we prove that the ground-state energy E of the semirelativistic Hamiltonian H = m2 + p2 + V(r) is bounded below by the ground-state energy e of the corresponding Klein--Gordon problem (p2 + m2)φ = (V(r) -e)2φ. Detailed results are presented for the exponential and Woods--Saxon potentials.