Potential envelope theory and the local energy theorem

Abstract: We consider a one-particle bound quantum mechanical system governed by a Schrödinger operator H = −∆ + v f (r), where f (r) is an attractive central potential, and v > 0 is a coupling parameter. If φ ∈ D(H ) is a 'trial function', the local energy theorem tells us that the discrete energies of H are bounded by the extreme values of (H φ)/φ, as a function of r. We suppose that f (r) is a smooth transformation of the form f = g(h), where g is monotone increasing with definite convexity and h(r) is a potential fo… Show more

Quasi Kepler’s third law for quantum many-body systems

Quasi Kepler’s third law for quantum many-body systems