Serge Aubry - Physics Department . Technion
Serge Aubry - Physics Department . Technion Serge Aubry - Physics Department . Technion
Serge Aubry, Aubry, LLB, FRANCE t=1.2. 10 8 red Profile (log) In Anderson space (Quartic Klein Gordon model W=4 In real space: random DNLS t=10 7 black t=2. 10 8 red
Participation number of norm distribution for the random DNLS model for different amplitudes of the single site initial wave packet Serge Aubry, Aubry, LLB, FRANCE
- Page 1 and 2: Suppression of Energy Diffusion in
- Page 3 and 4: I-Nonlinear spatially periodic syst
- Page 5 and 6: Initial wavepacket Time periodic so
- Page 7 and 8: II- Exact Time Periodic Solutions (
- Page 9 and 10: Numerical Calculation of Localized
- Page 11 and 12: RDNLS: a straightforward proof of e
- Page 13 and 14: Anderson Representation of DNLS nor
- Page 15: Quasiperiodic Periodic Solutions: B
- Page 18 and 19: The probability to find an initial
- Page 20 and 21: Assume the wavepacket spreads unifo
- Page 22 and 23: Example: What is the behavior of a
- Page 24 and 25: V Diffusion of a Wavepacket in nonl
- Page 26 and 27: There are initial conditions with n
- Page 28 and 29: VI-New Numerical Investigations G.
- Page 32 and 33: Participation number of norm distri
- Page 34 and 35: Serge Aubry, Aubry, LLB, FRANCE Tim
- Page 36 and 37: Scenario for the Absence of spreadi
- Page 38 and 39: Warning about the problem of reliab
- Page 40 and 41: VII Summary and concluding remarks
<strong>Serge</strong> <strong>Aubry</strong>, <strong>Aubry</strong>,<br />
LLB, FRANCE<br />
t=1.2. 10 8 red<br />
Profile (log)<br />
In Anderson space<br />
(Quartic Klein Gordon model<br />
W=4<br />
In real space:<br />
random DNLS<br />
t=10 7 black<br />
t=2. 10 8 red