How to create a 3D animation of a surface defined by 2 spatial coordinates using matplotlib/Mayavi?

Here is a numerical code of a 1D diffusion equation using for discretizing a finite difference scheme. The velocity is obtained for each time step and I would like to animate this solution in order to visualize the evolution of velocity with respect to time under diffusion. Any help would be appreciated. Thank you!

``````import numpy as np
import matplotlib.pyplot as plt
from mpl_toolkits.mplot3d import Axes3D ##library for 3d projection plots
from matplotlib import cm ##cm = "colormap" for changing the 3d plot color palette

###variable declarations
nx = 31
ny = 31
nt = 17
nu=.05
dx = 2.0/(nx-1)
dy = 2.0/(ny-1)
sigma = .25
dt = sigma*dx*dy/nu

x = np.linspace(0,2,nx)
y = np.linspace(0,2,ny)

u = np.ones((ny,nx)) ##create a 1xn vector of 1's
un = np.ones((ny,nx)) ##

u[.5/dy:1/dy+1,.5/dx:1/dx+1]=2 ##set hat function I.C. : u(.5<=x<=1 && .5<=y<=1 ) is 2

fig = plt.figure()
ax = fig.gca(projection='3d')
X,Y = np.meshgrid(x,y)
surf = ax.plot_surface(X,Y,u[:], rstride=1, cstride=1, cmap=cm.coolwarm,
linewidth=0, antialiased=False)
plt.show()
ax.set_xlim(0,2)
ax.set_ylim(0,2)
ax.set_zlim(1,2.5)
#ax.zaxis.set_major_locator(LinearLocator(5))

###Run through nt timesteps

u[.5/dy:1/dy+1,.5/dx:1/dx+1]=2

for n in range(nt+1):
un[:] = u[:]
u[1:-1,1:-1]=un[1:-1,1:-1]+nu*dt/dx**2*(un[2:,1:-1]-2*un[1:-1,1:-1]+un[0:-2,1:-1])+nu*dt/dy**2*   (un[1:-1,2:]-2*un[1:-1,1:-1]+un[1:-1,0:-2])

u[0,:]=1
u[-1,:]=1

u[:,0]=1
u[:,-1]=1

fig = plt.figure()
ax = fig.gca(projection='3d')
surf = ax.plot_surface(X,Y,u[:], rstride=1, cstride=1, cmap=cm.coolwarm,
linewidth=0, antialiased=True)
ax.set_zlim(1,2.5)
plt.show()
``````
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Here's one approach using Mayavi - read the comments for some explanation:

``````import numpy as np
import time

# import mayavi's mlab API for scripting
from mayavi import mlab

###variable declarations
nx = 31
ny = 31
nt = 17
nu=.05
dx = 2.0/(nx-1)
dy = 2.0/(ny-1)
sigma = .25
dt = sigma*dx*dy/nu

x = np.linspace(0,2,nx)
y = np.linspace(0,2,ny)

u = np.ones((ny,nx)) ##create a 1xn vector of 1's
un = np.ones((ny,nx)) ##

u[.5/dy:1/dy+1,.5/dx:1/dx+1]=2 ##set hat function I.C. : u(.5<=x<=1 && .5<=y<=1 ) is 2
X,Y = np.meshgrid(x,y)

###Run through nt timesteps

u[.5/dy:1/dy+1,.5/dx:1/dx+1]=2

# create a surface from grid-shaped data
surf = mlab.mesh(X,Y,u[:])

t = time.time()
max_framerate = 10
for n in range(nt+1):
un[:] = u[:]
u[1:-1,1:-1]=un[1:-1,1:-1]+nu*dt/dx**2*(un[2:,1:-1]-2*un[1:-1,1:-1]+un[0:-2,1:-1])+nu*dt/dy**2*   (un[1:-1,2:]-2*un[1:-1,1:-1]+un[1:-1,0:-2])

u[0,:]=1
u[-1,:]=1

u[:,0]=1
u[:,-1]=1

# the mlab_source attribute of surf represents the data we're plotting.
# it has x, y and z attributes as you'd expect. here we only need to
# update the z attribute
surf.mlab_source.z = u

# there's no need to call any equivalent to matplotlib's draw() or show()
# functions - another draw event gets triggered automatically whenever
# surf's data source gets modified

# put a pause in here to control the maximum framerate
while time.time() - t < (1./max_framerate):
pass
t = time.time()
``````

You can find out more about animating data in Mayavi here.

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Thank you Ali for your answer. I can visualize now beautiful animations! :) – Strömungsmechanik Feb 3 '14 at 6:40