Αρχείο:BMonSphere.jpg
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| Περιγραφή | Brownian Motion on a Sphere. The generator of ths process is ½ times the Laplace-Beltrami-Operator |
| Ημερομηνία | Summer 2007 (blender file as of 28.06.2007) |
| Πηγή | read some papers (eg Price, Gareth C.; Williams, David: "Rolling with “slipping”" : I. Séminaire de probabilités de Strasbourg, 17 (1983), p. 194-197 You can download it from http://www.numdam.org/item?id=SPS_1983__17__194_0) use the GNU R code and the python code (in blender3d) to create this image. |
| Δημιουργός | Thomas Steiner |
| Άδεια (Επαναχρησιμοποίηση αυτού του αρχείου) |
Thomas Steiner put it under the CC-by-SA 2.5. If you use the python code or the R code, please give a reference to Christian Bayer and Thomas Steiner. |
Αυτή η εικόνα δημιουργήθηκε με Blender.
Το αρχείο διανέμεται υπό την άδεια Creative Commons Αναφορά-Παρόμοια Διανομή 2.5 Γενική
- Είστε ελεύθερος:
- να μοιραστείτε – να αντιγράψετε, διανέμετε και να μεταδώσετε το έργο
- να διασκευάσετε – να τροποποιήσετε το έργο
- Υπό τις ακόλουθες προϋποθέσεις:
- αναφορά προέλευσης – Θα πρέπει να κάνετε κατάλληλη αναφορά, να παρέχετε σύνδεσμο για την άδεια και να επισημάνετε εάν έγιναν αλλαγές. Μπορείτε να το κάνετε με οποιοδήποτε αιτιολογήσιμο λόγο, χωρίς όμως να εννοείται με οποιονδήποτε τρόπο ότι εγκρίνουν εσάς ή τη χρήση του έργου από εσάς.
- παρόμοια διανομή – Εάν αλλάξετε, τροποποιήσετε ή δημιουργήσετε πάνω στο έργο αυτό, μπορείτε να διανείμετε αυτό που θα προκύψει μόνο υπό τους όρους της ίδιας ή συμβατής άδειας με το πρωτότυπο.
code
Perhaps you grab the source from the "edit" page without the wikiformating.
GNU R
This creates the paths and saves them into textfiles that can be read by blender. There are also paths for BMs on a torus.
# calculate a Brownian motion on the sphere; the output is a list
# consisting of:
# Z ... BM on the sphere
# Y ... tangential BM, see Price&Williams
# b ... independent 1D BM (see Price & Williams)
# B ... generating 3D BM
# n ... number of time-steps in the discretization
# T ... the above processes are given on a uniform mesh of size
# n on [0,T]
euler = function(x0, T, n) {
# initialize objects
dt = T/(n-1);
dB = matrix(rep(0,3*(n-1)),ncol=3, nrow=n-1);
dB[,1] = rnorm(n-1, 0, sqrt(dt));
dB[,2] = rnorm(n-1, 0, sqrt(dt));
dB[,3] = rnorm(n-1, 0, sqrt(dt));
Z = matrix(rep(0,3*n), ncol=3, nrow=n);
dZ = matrix(rep(0,3*(n-1)), ncol=3, nrow=n-1);
Y = matrix(rep(0,3*n), ncol=3, nrow=n);
B = matrix(rep(0,3*n), ncol=3, nrow=n);
b = rep(0, n);
Z[1,] = x0;
#do the computation
for(k in 2:n){
B[k,] = B[k-1,] + dB[k-1,];
dZ[k-1,] = cross(Z[k-1,],dB[k-1,]) - Z[k-1,]*dt;
Z[k,] = Z[k-1,] + dZ[k-1,];
Y[k,] = Y[k-1,] - cross(Z[k-1,],dZ[k-1,]);
b[k] = b[k-1] + dot(Z[k-1,],dB[k-1,]);
}
return(list(Z = Z, Y = Y, b = b, B = B, n = n, T = T));
}
# write the output from euler in csv-files
euler.write = function(bms, files=c("Z.csv","Y.csv","b.csv","B.csv"),steps=bms$n){
bigsteps=round(seq(1,bms$n,length=steps))
write.table(bms$Z[bigsteps,],file=files[1],col.names=F,row.names=F,sep=",",dec=".");
write.table(bms$Y[bigsteps,],file=files[2],col.names=F,row.names=F,sep=",",dec=".");
write.table(bms$b[bigsteps],file=files[3],col.names=F,row.names=F,sep=",",dec=".");
write.table(bms$B[bigsteps,],file=files[4],col.names=F,row.names=F,sep=",",dec=".");
}
# calculate a Brownian motion on a 3-d torus with outer
# radius R and inner radius r
eulerTorus = function(x0, r, R, t, n) {
# initialize objects
dt = t/(n-1);
dB = matrix(rep(0,3*(n-1)),ncol=3, nrow=n-1);
dB[,1] = rnorm(n-1, 0, sqrt(dt));
dB[,2] = rnorm(n-1, 0, sqrt(dt));
dB[,3] = rnorm(n-1, 0, sqrt(dt));
Z = matrix(rep(0,3*n), ncol=3, nrow=n);
B = matrix(rep(0,3*n), ncol=3, nrow=n);
dZ = matrix(rep(0,3*(n-1)), ncol=3, nrow=n-1);
Z[1,] = x0;
nT = rep(0,3);
#do the computation
for(k in 2:n){
B[k,] = B[k-1,] + dB[k-1,];
nT = nTorus(Z[k-1,],r,R);
dZ[k-1,] = cross(nT, dB[k-1,]) + HTorus(Z[k-1,],r,R)*nT*dt;
Z[k,] = Z[k-1,] + dZ[k-1,];
}
return(list(Z = Z, B = B, n = n, t = t));
}
# write the output from euler in csv-files
torus.write = function(bmt, files=c("tZ.csv","tB.csv"),steps=bmt$n){
bigsteps=round(seq(1,bmt$n,length=steps))
write.table(bmt$Z[bigsteps,],file=files[1],col.names=F,row.names=F,sep=",",dec=".");
write.table(bmt$B[bigsteps,],file=files[2],col.names=F,row.names=F,sep=",",dec=".");
}
# "defining" function of a torus
fTorus = function(x,r,R){
return((x[1]^2+x[2]^2+x[3]^2+R^2-r^2)^2 - 4*R^2*(x[1]^2+x[2]^2));
}
# normal vector of a 3-d torus with outer radius R and inner radius r
nTorus = function(x, r, R) {
c1 = x[1]*(x[1]^2+x[2]^2+x[3]^2-R^2-r^2)/(3*x[1]^4*x[2]^2+3*x[3]^4*x[2]^2
+3*x[3]^4*x[1]^2+6*x[3]^2*x[1]^2*x[2]^2+3*x[1]^2*x[2]^4+3*x[3]^2*x[2]^4
-2*x[3]^2*R^2*r^2-4*x[1]^2*x[2]^2*R^2+x[1]^6+x[2]^6+x[3]^6+3*x[3]^2*x[1]^4
-4*x[1]^2*x[2]^2*r^2-4*x[1]^2*x[3]^2*r^2+2*R^2*x[1]^2*r^2
-4*x[2]^2*x[3]^2*r^2+2*R^2*x[2]^2*r^2-2*x[1]^4*R^2-2*x[1]^4*r^2
+R^4*x[1]^2+x[1]^2*r^4-2*x[2]^4*R^2-2*x[2]^4*r^2+R^4*x[2]^2+x[2]^2*r^4
+x[3]^2*R^4+x[3]^2*r^4-2*x[3]^4*r^2+2*x[3]^4*R^2)^(1/2);
c2 = x[2]*(x[1]^2+x[2]^2+x[3]^2-R^2-r^2)/(3*x[1]^4*x[2]^2+3*x[3]^4*x[2]^2
+3*x[3]^4*x[1]^2+6*x[3]^2*x[1]^2*x[2]^2+3*x[1]^2*x[2]^4+3*x[3]^2*x[2]^4
-2*x[3]^2*R^2*r^2-4*x[1]^2*x[2]^2*R^2+x[1]^6+x[2]^6+x[3]^6
+3*x[3]^2*x[1]^4-4*x[1]^2*x[2]^2*r^2-4*x[1]^2*x[3]^2*r^2+2*R^2*x[1]^2*r^2
-4*x[2]^2*x[3]^2*r^2+2*R^2*x[2]^2*r^2-2*x[1]^4*R^2-2*x[1]^4*r^2+R^4*x[1]^2
+x[1]^2*r^4-2*x[2]^4*R^2-2*x[2]^4*r^2+R^4*x[2]^2+x[2]^2*r^4+x[3]^2*R^4
+x[3]^2*r^4-2*x[3]^4*r^2+2*x[3]^4*R^2)^(1/2);
c3 = (x[1]^2+x[2]^2+x[3]^2+R^2-r^2)*x[3]/(3*x[1]^4*x[2]^2+3*x[3]^4*x[2]^2
+3*x[3]^4*x[1]^2
+6*x[3]^2*x[1]^2*x[2]^2
+3*x[1]^2*x[2]^4+3*x[3]^2*x[2]^4
-2*x[3]^2*R^2*r^2
-4*x[1]^2*x[2]^2*R^2+x[1]^6
+x[2]^6+x[3]^6+3*x[3]^2*x[1]^4
-4*x[1]^2*x[2]^2*r^2
-4*x[1]^2*x[3]^2*r^2
+2*R^2*x[1]^2*r^2
-4*x[2]^2*x[3]^2*r^2
+2*R^2*x[2]^2*r^2-2*x[1]^4*R^2
-2*x[1]^4*r^2+R^4*x[1]^2
+x[1]^2*r^4-2*x[2]^4*R^2
-2*x[2]^4*r^2+R^4*x[2]^2
+x[2]^2*r^4+x[3]^2*R^4
+x[3]^2*r^4-2*x[3]^4*r^2
+2*x[3]^4*R^2)^(1/2);
return(c(c1,c2,c3));
}
# mean curvature of a 3-d torus with outer radius R and inner radius r
HTorus = function(x, r, R){
return( -(3*x[1]^4*r^4+4*x[2]^6*x[3]^2+4*x[1]^6*x[2]^2-3*x[2]^4*x[3]^2*R^2
-2*x[1]^6*R^2+4*x[1]^2*x[3]^6+x[3]^6*R^2+4*x[2]^4*R^2*r^2-x[1]^2*r^6
-x[2]^2*r^6+x[2]^4*R^4+4*x[2]^2*x[3]^2*R^4+6*x[2]^2*x[3]^2*r^4
-2*x[1]^2*R^2*r^4-x[1]^2*R^4*r^2-9*x[1]^4*x[2]^2*r^2
-9*x[1]^4*x[3]^2*r^2+4*x[1]^4*R^2*r^2+12*x[1]^2*x[3]^4*x[2]^2
-3*x[2]^6*r^2+4*x[1]^6*x[3]^2+3*x[3]^4*r^4-x[3]^4*R^4
-9*x[2]^4*x[3]^2*r^2+2*x[2]^2*x[3]^2*R^2*r^2+4*x[1]^2*x[2]^6
-6*x[1]^2*x[3]^2*x[2]^2*R^2-x[3]^2*r^6+6*x[2]^4*x[3]^4+x[3]^8
+x[1]^8+x[2]^8-3*x[1]^6*r^2+6*x[1]^4*x[3]^4+12*x[1]^2*x[3]^2*x[2]^4
-6*x[1]^2*x[2]^4*R^2-2*x[3]^4*R^2*r^2-2*x[2]^2*R^2*r^4-x[2]^2*R^4*r^2
-9*x[2]^2*x[3]^4*r^2+x[3]^2*R^2*r^4+x[3]^2*R^4*r^2-9*x[1]^2*x[2]^4*r^2
+2*x[1]^2*R^4*x[2]^2+6*x[1]^2*x[2]^2*r^4-3*x[1]^4*x[3]^2*R^2
-6*x[1]^4*x[2]^2*R^2+4*x[1]^2*x[3]^2*R^4+6*x[1]^2*x[3]^2*r^4
-9*x[1]^2*x[3]^4*r^2+8*x[1]^2*R^2*x[2]^2*r^2+2*x[1]^2*x[3]^2*R^2*r^2
+x[1]^4*R^4-3*x[3]^6*r^2-2*x[2]^6*R^2+6*x[1]^4*x[2]^4-x[3]^2*R^6
-18*x[1]^2*x[2]^2*x[3]^2*r^2+4*x[2]^2*x[3]^6+12*x[1]^4*x[3]^2*x[2]^2
+3*x[2]^4*r^4)/(3*x[1]^4*x[2]^2+3*x[3]^4*x[2]^2+3*x[3]^4*x[1]^2
+6*x[3]^2*x[1]^2*x[2]^2+3*x[1]^2*x[2]^4+3*x[3]^2*x[2]^4
-2*x[3]^2*R^2*r^2-4*x[1]^2*x[2]^2*R^2+x[1]^6+x[2]^6
+x[3]^6+3*x[3]^2*x[1]^4-4*x[1]^2*x[2]^2*r^2
-4*x[1]^2*x[3]^2*r^2+2*R^2*x[1]^2*r^2
-4*x[2]^2*x[3]^2*r^2+2*R^2*x[2]^2*r^2-2*x[1]^4*R^2
-2*x[1]^4*r^2+R^4*x[1]^2+x[1]^2*r^4-2*x[2]^4*R^2
-2*x[2]^4*r^2+R^4*x[2]^2+x[2]^2*r^4+x[3]^2*R^4
+x[3]^2*r^4-2*x[3]^4*r^2+2*x[3]^4*R^2)^(3/2));
}
# calculate the cross product of the two 3-dim vectors
# x and y. No argument-checking for performance reasons
cross = function(x,y){
res = rep(0,3);
res[1] = x[2]*y[3] - x[3]*y[2];
res[2] = -x[1]*y[3] + x[3]*y[1];
res[3] = x[1]*y[2] - x[2]*y[1];
return(res);
}
# calculate the inner product of two vectors of dim 3
# returns a number, not a 1x1-matrix!
dot = function(x,y){
return(sum(x*y));
}
# calculate the cross product of the two 3-dim vectors
# x and y. No argument-checking for performance reasons
cross = function(x,y){
res = rep(0,3);
res[1] = x[2]*y[3] - x[3]*y[2];
res[2] = -x[1]*y[3] + x[3]*y[1];
res[3] = x[1]*y[2] - x[2]*y[1];
return(res);
}
#############
### main-teil
set.seed(280180)
et=eulerTorus(c(3,0,0),3,5,19,10000)
torus.write(et,steps=9000)
#
#bms=euler(c(1,0,0),4,70000)
#euler.write(bms,steps=10000)
blender3d
The blender (python) code to create a image that looks almost like this one. Play around...
## import data from matlab-text-file and draw BM on the S^2
## (c) 2007 by Christan Bayer and Thomas Steiner
from Blender import Curve, Object, Scene, Window, BezTriple, Mesh, Material, Camera,
World
from math import *
##import der BM auf der Kugel aus einem csv-file
def importcurve(inpath="Z.csv"):
infile = open(inpath,'r')
lines = infile.readlines()
vec=[]
for i in lines:
li=i.split(',')
vec.append([float(li[0]),float(li[1]),float(li[2].strip())])
infile.close()
return(vec)
##function um aus einem vektor (mit den x,y,z Koordinaten) eine Kurve zu machen
def vec2Cur(curPts,name="BMonSphere"):
bztr=[]
bztr.append(BezTriple.New(curPts[0]))
bztr[0].handleTypes=(BezTriple.HandleTypes.VECT,BezTriple.HandleTypes.VECT)
cur=Curve.New(name) ##TODO wenn es das Objekt schon gibt, dann nicht neu erzeugen
cur.appendNurb(bztr[0])
for i in range(1,len(curPts)):
bztr.append(BezTriple.New(curPts[i]))
bztr[i].handleTypes=(BezTriple.HandleTypes.VECT,BezTriple.HandleTypes.VECT)
cur[0].append(bztr[i])
return( cur )
#erzeugt einen kreis, der später die BM umgibt (liegt in y-z-Ebene)
def circle(r,name="tubus"):
bzcir=[]
bzcir.append(BezTriple.New(0.,-r,-4./3.*r, 0.,-r,0., 0.,-r,4./3.*r))
bzcir[0].handleTypes=(BezTriple.HandleTypes.FREE,BezTriple.HandleTypes.FREE)
cur=Curve.New(name) ##TODO wenn es das Objekt schon gibt, dann nicht neu erzeugen
cur.appendNurb(bzcir[0])
#jetzt alle weietren pkte
bzcir.append(BezTriple.New(0.,r,4./3.*r, 0.,r,0., 0.,r,-4./3.*r))
bzcir[1].handleTypes=(BezTriple.HandleTypes.FREE,BezTriple.HandleTypes.FREE)
cur[0].append(bzcir[1])
bzcir.append(BezTriple.New(0.,-r,-4./3.*r, 0.,-r,0., 0.,-r,4./3.*r))
bzcir[2].handleTypes=(BezTriple.HandleTypes.FREE,BezTriple.HandleTypes.FREE)
cur[0].append(bzcir[2])
return ( cur )
#erzeuge mit skript eine (glas)kugel (UVSphere)
def sphGlass(r=1.0,name="Glaskugel",n=40,smooth=0):
glass=Mesh.New(name) ##TODO wenn es das Objekt schon gibt, dann nicht neu erzeugen
for i in range(0,n):
for j in range(0,n):
x=sin(j*pi*2.0/(n-1))*cos(-pi/2.0+i*pi/(n-1))*1.0*r
y=cos(j*pi*2.0/(n-1))*(cos(-pi/2.0+i*pi/(n-1)))*1.0*r
z=sin(-pi/2.0+i*pi/(n-1))*1.0*r
glass.verts.extend(x,y,z)
for i in range(0,n-1):
for j in range(0,n-1):
glass.faces.extend([i*n+j,i*n+j+1,(i+1)*n+j+1,(i+1)*n+j])
glass.faces[i*(n-1)+j].smooth=1
return( glass )
def torus(r=0.3,R=1.4):
krGro=circle(r=R,name="grTorusKreis")
#jetzt das material ändern
def verglasen(mesh):
matGlass = Material.New("glas") ##TODO wenn es das Objekt schon gibt, dann nicht
neu erzeugen
#matGlass.setSpecShader(0.6)
matGlass.setHardness(30) #für spec: 30
matGlass.setRayMirr(0.15)
matGlass.setFresnelMirr(4.9)
matGlass.setFresnelMirrFac(1.8)
matGlass.setIOR(1.52)
matGlass.setFresnelTrans(3.9)
matGlass.setSpecTransp(2.7)
#glass.materials.setSpecTransp(1.0)
matGlass.rgbCol = [0.66, 0.81, 0.85]
matGlass.mode |= Material.Modes.ZTRANSP
matGlass.mode |= Material.Modes.RAYTRANSP
#matGlass.mode |= Material.Modes.RAYMIRROR
mesh.materials=[matGlass]
return ( mesh )
def maleBM(mesh):
matDraht = Material.New("roterDraht") ##TODO wenn es das Objekt schon gibt, dann
nicht neu erzeugen
matDraht.rgbCol = [1.0, 0.1, 0.1]
mesh.materials=[matDraht]
return( mesh )
#eine solide Mesh-Ebene (Quader)
# auf der höhe ebh, dicke d, seitenlänge (quadratisch) 2*gr
def ebene(ebh=-2.5,d=0.1,gr=6.0,name="Schattenebene"):
quader=Mesh.New(name) ##TODO wenn es das Objekt schon gibt, dann nicht neu erzeugen
#obere ebene
quader.verts.extend(gr,gr,ebh)
quader.verts.extend(-gr,gr,ebh)
quader.verts.extend(-gr,-gr,ebh)
quader.verts.extend(gr,-gr,ebh)
#untere ebene
quader.verts.extend(gr,gr,ebh-d)
quader.verts.extend(-gr,gr,ebh-d)
quader.verts.extend(-gr,-gr,ebh-d)
quader.verts.extend(gr,-gr,ebh-d)
quader.faces.extend([0,1,2,3])
quader.faces.extend([0,4,5,1])
quader.faces.extend([1,5,6,2])
quader.faces.extend([2,6,7,3])
quader.faces.extend([3,7,4,0])
quader.faces.extend([4,7,6,5])
#die ebene einfärben
matEb = Material.New("ebenen_material") ##TODO wenn es das Objekt schon gibt, dann
nicht neu erzeugen
matEb.rgbCol = [0.53, 0.51, 0.31]
matEb.mode |= Material.Modes.TRANSPSHADOW
matEb.mode |= Material.Modes.ZTRANSP
quader.materials=[matEb]
return (quader)
###################
#### main-teil ####
# wechsel in den edit-mode
editmode = Window.EditMode()
if editmode: Window.EditMode(0)
dataBMS=importcurve("C:/Dokumente und Einstellungen/thire/Desktop/bmsphere/Z.csv")
#dataBMS=importcurve("H:\MyDocs\sphere\Z.csv")
BMScur=vec2Cur(dataBMS,"BMname")
#dataStereo=importcurve("H:\MyDocs\sphere\stZ.csv")
#stereoCur=vec2Cur(dataStereo,"SterName")
cir=circle(r=0.01)
glass=sphGlass()
glass=verglasen(glass)
ebe=ebene()
#jetzt alles hinzufügen
scn=Scene.GetCurrent()
obBMScur=scn.objects.new(BMScur,"BMonSphere")
obcir=scn.objects.new(cir,"round")
obgla=scn.objects.new(glass,"Glaskugel")
obebe=scn.objects.new(ebe,"Ebene")
#obStereo=scn.objects.new(stereoCur,"StereoCurObj")
BMScur.setBevOb(obcir)
BMScur.update()
BMScur=maleBM(BMScur)
#stereoCur.setBevOb(obcir)
#stereoCur.update()
cam = Object.Get("Camera")
#cam.setLocation(-5., 5.5, 2.9)
#cam.setEuler(62.0,-1.,222.6)
#alternativ, besser??
cam.setLocation(-3.3, 8.4, 1.7)
cam.setEuler(74,0,200)
world=World.GetCurrent()
world.setZen([0.81,0.82,0.61])
world.setHor([0.77,0.85,0.66])
if editmode: Window.EditMode(1) # optional, zurück n den letzten modus
#ergebnis von
#set.seed(24112000)
#sbm=euler(c(0,0,-1),T=1.5,n=5000)
#euler.write(sbm)
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| Ημερομηνία/Ώρα | Μικρογραφία | Διαστάσεις | Χρήστης | Σχόλιο | |
|---|---|---|---|---|---|
| τρέχον | 20:53, 22 Δεκεμβρίου 2013 | | 365 × 356 (10 KB) | wikimediacommons>Olli Niemitalo | Cropped (in a JPEG-lossless way) |
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