Low Energy Behavior of Quantum Adsorption
Abstract
We present an exact solution of a 1D model: a particle of incident energy E colliding with a target which is a 1D harmonic ``solid slab'' with N atoms in its ground state; the Hilbert space of the target is restricted to the (N+1) states with zero or one phonon present. For the case of a short range interaction, V(z), between the particle and the surface atom supporting a bound state, an explicit non-perturbative solution of the collision problem is presented. For finite and large N, there is no true sticking but only so-called Feshbach resonances. A finite sticking coefficient s(E) is obtained by introducing a small phonon decay rate η and letting N∞. Our main interest is in the behavior of s(E) as E 0. For a short range V(z), we find s(E) E1/2, regardless of the strength of the particle-phonon coupling. However, if V(z) has a Coulomb z-1 tail, we find s(E)α, where 0 < α< 1. [A fully classical calculation gives s(E) 1 in both cases.] We conclude that the same threshold laws apply to 3D systems of neutral and charged particles respectively.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.