,
Quantum freeze of fidelity decay for a class of integrable dynamics
Tomaz Prosen and Marko Znidaric
available also from arXiv.org
Explanation of animations (extending fig.5 of the paper):
All animations show time evolution of the echoed Wigner function of a quantized top, i.e. the Wigner function of a state after a forward time evolution with Hamiltonian H followed by a backward time evolution with a perturbed Hamiltonian H'. The initial state is the same coherent state in all animations. See text of the manuscript for details.
Fidelity F(t) at time t is just an overlap between the echoed Wigner function at time t and the Wigner function of the initial state, which is a Gaussian. The same property holds for a classical phase-space density and the classical fidelity.
Animations for two different systems are shown (see
paper), one with ω″=0, having strong resonances, and another for ω″=4
where resonances are supressed. For each case we show three movies in .AVI
format, one for short times of correspondence with the classical fidelity
(also shown in parallel), one for intermediate times when quantum fidelity
has a plateau, and one for long times when fidelity exhibits balistic decay.
The unitary one step propagator in the case of ω″=0 is:
,while in the case where we suppress the resonances by a nonvanishing second
derivative of the frequency ω″=4, the propagator reads
,where j* is the action coordinate of the center of the coherent state.
The perturbed evolution is in both cases generated by x-component of the
spin
.For all animations we use S=200, δ= 0.0016, and show only the upper hemisphere of the phase space, 0 < φ < 2 π , 0 < cos θ < 1.
System with ω″=0
Short time quantum (red curve) and classical (green curve) fidelity
decay. Note pointwise agreement up to the 'regular Ehrenfest time' which
is in this case ~14.
Short time animation from t=0 to t=240 (0.4 MB .avi or 0.8 MB .mpg
). Lower part shows the classical density producing the classical fidelity.
At time t1=14 the correspondence between the classical and quantum
evolution stops. The classical fidelity decays in a power law fashion
while the quantum fidelity freezes on a plateau.
Intermediate time animation from t=80 to t=2000, in steps
of 10 (0.3 MB .avi or 0.9
MB .mpg). This is a regime of the plateau in the quantum fidelity.
The plateau can here be seen to originate from a part of a packet which stays
localized at the initial position, giving a constant overlap with the initial
Wigner function. The mechanism producing the quantum resonances is also nicely
illustrated.
Long time animation from t=2000 to t=140000, in steps
of 1000 (0.5 MB .avi or 0.8 MB
.mpg). Here the Gaussian decay of fidelity due to a balistic
movement of an echo begins.
System with ω″=4
Long time quantum fidelity decay for ω″=0 (green) and ω″=4 (red):
Short time animation from t=0 to t=240 (0.6 MB .avi or 0.7 MB .mpg).
Intermediate time animation from t=80 to t=2000,
in steps of 10 (0.7 MB .avi or 0.8 MB .mpg). The regime of the plateau.
Long time animation from t=2000 to t=150000,
in steps of 1000 (0.9 MB .avi or 0.8 MB .mpg). The regime of ballistic decay.