When in a collinear configuration, the spectrum of this quantum system can be computed with impressive accuracy by quantizing its unstable classical orbits using the Gutzwiller trace formula. For 10 points each:
[10m] Name this system, whose potential energy in atomic units is “negative 2 over r1 minus 2 over r2 plus 1 over r1 minus r2.” The final repulsive term prevents this system from being exactly solvable, unlike a lighter counterpart.
ANSWER: helium atom [reject “helium nucleus” or “alpha particle”]
[10e] The helium atom is important in quantum chaos because the dynamics of its two electrons and nucleus are similar to this chaotic classical system. The Moon, Sun, and Earth form an example of this system, which lacks a closed-form solution.
ANSWER: three-body problem [prompt on n-body problem]
[10h] For a generic chaotic Hamiltonian, the gaps in the spectrum are distributed according to this physicist’s namesake “surmise.” The phase space formulation of QM is based on this physicist’s “quasiprobability” distribution.
ANSWER: Eugene Wigner
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