Inverse square potential explained
In quantum mechanics, the inverse square potential is a form of a central force potential which has the unusual property of the eigenstates of the corresponding Hamiltonian operator remaining eigenstates in a scaling of all cartesian coordinates by the same constant.[1] Apart from this curious feature, it's by far less important central force problem than that of the Keplerian inverse square force system.
Description
The potential energy function of an inverse square potential is
,
where
is some constant and
is the
Euclidean distance from some central point. If
is positive, the potential is attractive and if
is negative, the potential is repulsive. The corresponding
Hamiltonian operator
},\hat) is
,
where
is the mass of the particle moving in the potential.
Properties
The canonical commutation relation of quantum mechanics,
[\hat{x}i,\hat{p}i]=i\hbar
, has the property of being invariant in a scaling
, and
,
where
is some scaling factor. The momentum
and the position
are vectors, while the components
,
and the radius
are scalars. In an inverse square potential system, if a wavefunction
is an eigenfunction of the Hamiltonian operator
},\hat), it is also an eigenfunction of the operator
}',\hat'), where the scaled operators
and
are defined as above.
This also means that if a radially symmetric wave function
is an eigenfunction of
with eigenvalue
, then also
is an eigenfunction, with eigenvalue
. Therefore, the energy spectrum of the system is a continuum of values.
The system with a particle in an inverse square potential with positive
(attractive potential) is an example of so-called
falling-to-center problem, where there is no lowest energy wavefunction and there are eigenfunctions where the particle is arbitrarily localized in the vicinity of the central point
.
[2] See also
Notes and References
- Martínez-y-Romero. R. P.. Núñez-Yépez. H. N.. Salas-Brito. A. L.. The two dimensional motion of a particle in an inverse square potential: Classical and quantum aspects. Journal of Mathematical Physics. 54. 5. 2013. 053509. 0022-2488. 10.1063/1.4804356.
- Vasyuta. Vasyl M.. Tkachuk. Volodymyr M.. Falling of a quantum particle in an inverse square attractive potential. The European Physical Journal D. 70. 12. 2016. 1434-6060. 10.1140/epjd/e2016-70463-3. 1505.04750. 118371904 .