Example of quantum systems reduction
Abstract
To solve the quantum-mechanical problem the procedure of mapping onto linear space W of generators of the (sub)group violated by given classical trajectory is formulated. The formalism is illustrated by the plane H-atom model. The problem is solved noting conservation of the Runge-Lentz vector n and reducing the 4-dimensional incident phase space T to the 3-dimensional linear subspace W=T* V× R1, where T* V is the (angular momentum (l) - angle ()) phase space and R1 =n. It is shown explicitly that (i) the motion in R1 is pure classical as the consequence of the reduction, (ii) motion in the direction is classical since the Kepler orbits are closed independently from initial conditions and (iii) motion in the l direction is classical since all corresponding quantum corrections are defined on the bifurcation line (l=∞) of the problem. In our terms the H-atom problem is exactly quasiclassical and is completely integrable by this reasons.
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