How Are Quantum Eigenfunctions of Hydrogen Atom Related To Its Classical Elliptic Orbits?

Abstract

We show that a highly-excited energy eigenfunction nlm(r) of hydrogen atom can be approximated as an equal-weight superposition of classical elliptic orbits with energy En and angular momentum L=l(l+1), and z component of angular momentum Lz=m. This correspondence is established by comparing the quantum probability distribution |nlm(r)|2 and the classical probability distribution pc(r) of an ensemble of such orbits. This finding illustrates a general principle: in the semi-classical limit, an energy eigenstate of a quantum system is in general reduced to a collection of classical orbits, rather than a single classical orbit.

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