We calculate the force operator for a charged particle in the field of an A
haronov-Bohm flux line. Formally this is the Lorentz force, with the magnet
ic field operator modified to include quantum corrections due to anomalous
commutation relations. For stationary states, the magnitude of the force is
proportional to the product of the wavenumber k with the amplitudes of the
'pinioned' components, the two angular momentum components whose azimuthal
quantum numbers are closest to the flux parameter alpha. The direction of
the force depends on the relative phase of the pinioned components. For par
axial beams, the transverse component of our expression gives an exact vers
ion of Shelankov's formula (Shelankov A 1998 Europhys. Lett. 43 623-8), whi
le the longitudinal component gives the force along the beam.
Nonstationary states are treated by integrating the force operator in time
to obtain the impulse operator. Expectation values of the impulse are calcu
lated for two kinds of wavepacket. For slow wavepackets, which spread faste
r than they move, the impulse is inversely proportional to the distance fro
m the flux line. For fast wavepackets, which spread only negligibly before
their closest approach to the flux line, the impulse is proportional to the
probability density transverse to the incident direction evaluated at the
flux line. In this case, the transverse component of the impulse gives a wa
vepacket analogue of Shelankov's formula. The direction of the impulse for
both kinds of wavepacket is flux dependent.
We give two derivations of the force and impulse operators, the first a sim
ple derivation based on formal arguments, and the second a rigorous calcula
tion of wavepacket expectation values. We also show that the same expressio
ns for the force and impulse are obtained if the flux line is enclosed in a
n impenetrable cylinder, or distributed uniformly over a flux cylinder, in
the limit that the radius of the cylinder goes to zero.