I want to construct a 3D representation of experimental data to track the deformation of a membrane. Experimentally, only the corner nodes are known. However I want to plot the deformaiton of the overall structure and this why I want to interpolate the membrane to enable a nice colormap of it. By searching around, I came almost close to it with the following code:

```
import numpy
from mpl_toolkits.mplot3d import Axes3D
from mpl_toolkits.mplot3d.art3d import Poly3DCollection
import matplotlib.pyplot as plt
from matplotlib import cm
from scipy.interpolate import griddata
x=numpy.array([0, 0, 1, 1])
y=numpy.array([0.5, 0.75, 1, 0.5])
z=numpy.array([0, 0.5, 1,0])
fig = plt.figure()
ax = Axes3D(fig)
verts = [zip(x, y, z)]
PC = Poly3DCollection(verts)
ax.add_collection3d(PC)
xi = numpy.linspace(x.min(),x.max(),20)
yi = numpy.linspace(y.min(),y.max(),20)
zi = griddata((x,y),z, (xi[None,:], yi[:,None]), method='linear')
xig, yig = numpy.meshgrid(xi, -yi)
ax.plot_surface(xig, yig, zi, rstride=1, cstride=1, linewidth=0,cmap=plt.cm.jet,norm=plt.Normalize(vmax=abs(yi).max(), vmin=-abs(yi).max()))
plt.show()
```

and get the following plot:

The blue polygon is the surface known by its corner nodes and that I want to colormap. The colormapped surface is my best result so far. However, there are the black polygons near the top of the surface that are troubling me. I think it might be due to the fact that the surface doesn't fit the meshgrid and so the fourth corner is here a Nan.

Is there a workaround to avoid these black triangles or even better a better way of colormapping a surface known only by its corner nodes?

EDIT: Here is the figure with the triangulation solution given in my first comment by using the following command

```
triang = tri.Triangulation(x, y)
ax.plot_trisurf(x, y, z, triangles=triang.triangles, cmap=cm.jet,norm=plt.Normalize(vmax=abs(yi).max(), vmin=-abs(yi).max()))
```