Fichier:Hamiltonian flow classical.gif
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Hamiltonian_flow_classical.gif (195 × 390 pixels, taille du fichier : 172 kio, type MIME : image/gif, en boucle, 86 trames, 26 s)
Description
| Description |
English: Flow of a statistical ensemble in the potential x**6 + 4*x**3 - 5*x**2 - 4*x. Over long times it becomes swirled up, and appears to become a smooth and stable distribution. However, this stability is an artifact of the pixelization (the actual structure is too fine to perceive). This animation is inspired by a discussion of Gibbs in his 1902 wikisource:Elementary Principles in Statistical Mechanics, Chapter XII, p. 143: "Tendency in an ensemble of isolated systems toward a state of statistical equilibrium". |
| Date | |
| Source | Travail personnel |
| Auteur | Nanite |
| Autres versions |
|
| GIF information | File:.svg et avec Inkscape. |
Source
Python source code. Requires matplotlib ImageMagick. Possibly does not run in Windows.
from pylab import *
import subprocess
import sys
import os
figformat = '.png'
seterr(divide='ignore')
rcParams['font.size'] = 9
#define color map that is transparent for low values, and dark blue for high values.
# weighted to show low probabilities well
cdic = {'red': [(0,0,0),(1,0,0)],
'green': [(0,0,0),(1,0,0)],
'blue': [(0,0.7,0.7),(1,0.7,0.7)],
'alpha': [(0,0,0),
(0.1,0.4,0.4),
(0.2,0.6,0.6),
(0.4,0.8,0.8),
(0.6,0.9,0.9),
(1,1,1)]}
cm_prob = matplotlib.colors.LinearSegmentedColormap('prob',cdic,N=640)
### System dynamics ###
# potential is a polynomial
potential_coefs = array([1,0,0,4,-5,-4,0],'d')
def potential(x,t):
return polyval(potential_coefs,x)
# force function is its derivative.
force_coefs = (potential_coefs*arange(len(potential_coefs)-1,-1,-1))[:-1]
def force(x,t):
""" derivative of potential(x) """
return polyval(force_coefs,x)
invmass = 1.0
dt = 0.03
def motion(t,x,p):
""" returns dx/dt, dp/dt """
return p*invmass, -force(x,t)
cur_x = -0.1
cur_p = 0
def rkky_step(t, x_i, p_i, dt):
kx1,kp1 = motion(t, x_i, p_i)
dt2 = 0.5*dt
kx2,kp2 = motion(t+dt2, x_i+dt2*kx1, p_i+dt2*kp1)
kx3,kp3 = motion(t+dt2, x_i+dt2*kx2, p_i+dt2*kp2)
kx4,kp4 = motion(t+dt, x_i+dt*kx3, p_i+dt*kp3)
newx = x_i + (dt/6.0)*(kx1 + 2.0*kx2 + 2.0*kx3 + kx4)
newp = p_i + (dt/6.0)*(kp1 + 2.0*kp2 + 2.0*kp3 + kp4)
return newx, newp
### Setup ensemble points ###
# most are randomly chosen
x = 0 + 0.5*rand(20000)
p = -1.0 + 2.0*rand(20000)
# the pilot points are set manually
x[0] = 0; p[0] = 0
x[1] = 0.4; p[1] = 0.0
pilots = [0,1]
pilot_colors = {
0: (0,0.7,0),
1: (0.7,0,0)}
E = potential(x,0) + 0.5*invmass*p**2
### set up plot limits and histogram bins ###
xedges = linspace(-2.1,1.7,151)
pedges = linspace(-7.5,7.5,151)
Eedges = linspace(-9,9,151)
pix = 150
extent = [xedges[0], xedges[-1], pedges[-1], pedges[0]]
H = histogram2d(x,p,bins=[xedges,pedges])[0].transpose()
cmax = amax(H)*0.8
extenten = [xedges[0], xedges[-1], Eedges[-1], Eedges[0]]
Hen = histogram2d(x,E,bins=[xedges,Eedges])[0].transpose()
cmaxen = amax(Hen)*0.3
fig = figure(1)
ysize = 2.6
xsize = 1.3
fig.set_size_inches(xsize,ysize)
### Prepare lower plot ###
axen = axes((0.2/xsize,0.2/ysize,1.0/xsize,1.0/ysize),frameon=True)
axen.xaxis.set_ticks([])
axen.xaxis.labelpad = 2
axen.yaxis.set_ticks([])
axen.yaxis.labelpad = 2
xlim(-2.1,1.7)
ylim(-9,9)
xlabel('position $x$')
ylabel('energy')
potx = linspace(-2.1,1.7,151)
### Prepare upper plot ###
ax = axes((0.2/xsize,1.5/ysize,1.0/xsize,1.0/ysize),frameon=True)
ax.xaxis.set_ticks([])
ax.xaxis.labelpad = 2
ax.yaxis.set_ticks([])
ax.yaxis.labelpad = 2
xlim(-2.1,1.7)
ylim(-7.5,7.5)
xlabel('position $x$')
ylabel('momentum $p$')
### Start running simulation ###
frames = list()
delays = list()
framemod = 5
frame = "frames/background"+figformat
savefig(frame,dpi=pix)
frames.append(frame)
delays.append(16)
print "generating frames... 0%",
sys.stdout.flush()
savesteps = range(0,401,framemod) + [600, 1000, 2000, 6000]
delays += [10]*len(savesteps)
delays[1] = 200
delays[-5:] = [100,200,200,200,400]
totalsteps = max(savesteps)+1
for step in range(totalsteps):
if step % 20 == 0:
print "\b\b\b\b\b{0:3}%".format(int(round(step*100.0/totalsteps))),
sys.stdout.flush()
if step in savesteps:
# Every several frames, do a plot
remlist = list()
sca(ax)
H = histogram2d(x,p,bins=[xedges,pedges])[0].transpose()
remlist.append(imshow(H, extent=extent, cmap=cm_prob, interpolation='none', aspect='auto'))
remlist[-1].set_clim(0,cmax)
for i in pilots:
remlist += plot(x[i], p[i], '.', color=pilot_colors[i], markersize=3)
E = potential(x,step*dt) + 0.5*invmass*p**2
sca(axen)
pot = potential(potx,step*dt)
remlist += plot(potx,pot,color='r',zorder=0)
Hen = histogram2d(x,E,bins=[xedges,Eedges])[0].transpose()
remlist.append(imshow(Hen, extent=extenten, cmap=cm_prob, interpolation='none', aspect='auto',zorder=1))
remlist[-1].set_clim(0,cmaxen)
for i in pilots:
remlist += plot(x[i], E[i], '.', color=pilot_colors[i], markersize=3)
frame = "frames/frame"+str(step)+figformat
savefig(frame,dpi=pix)
frames.append(frame)
# Clear out updated stuff.
for r in remlist: r.remove()
x, p = rkky_step(step*dt, x, p,dt)
print "\b\b\b\b\b done"
assert(len(delays) == len(frames))
### Assemble animation using ImageMagick ###
calllist = 'convert -dispose Background'.split()
for delay,frame in zip(delays,frames):
calllist += ['-delay',str(delay)]
calllist += [frame]
calllist += '-loop 0 -layers Optimize _animation.gif'.split()
f = open('anim_command.txt','w')
f.write(' '.join(calllist)+'\n')
f.close()
print "composing into animated gif...",
sys.stdout.flush()
subprocess.call(calllist)
print " done"
os.rename('_animation.gif','animation.gif')
Conditions d’utilisation
Moi, en tant que détenteur des droits d’auteur sur cette œuvre, je la publie sous la licence suivante :
 
|
Ce fichier est dans le domaine public selon les termes de la licence Creative Commons CC0 1.0 Universel. |
| La personne qui a associé une œuvre avec cet acte l’a placée dans le domaine public en renonçant mondialement à tous ses droits sur cette œuvre en vertu des lois relatives au droit d’auteur, ainsi qu’à tous les droits juridiques connexes et voisins qu’elle possédait sur l’œuvre, sans autre limite que celles imposées par la loi. Vous pouvez copier, modifier, distribuer et utiliser cette œuvre, y compris à des fins commerciales, sans qu’il soit nécessaire d’en demander la permission.
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Historique du fichier
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| Date et heure | Vignette | Dimensions | Utilisateur | Commentaire | |
|---|---|---|---|---|---|
| actuel | 27 octobre 2013 à 09:57 | | 195 × 390 (172 kio) | wikimediacommons>Nanite | Added potential plot (with bonus ensemble histogram in E,x), as well as a couple of "pilot" systems. |
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