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I attempt to solve a non-linear mathematical optimization problem with linear constraints. For this, I'm trying to visualize the constraints in 3d to see what is happening and why I get a feasible solutions for some parameters in the constraints and not others.

In order to achieve this, I want to use matplotlib from python to generate 3d surfaces (planes since all my constraints are linear).

However, without in-plot labeling, it is very difficult to identify which surface belongs to which constraint. This led me to want to look for a way to add a legend with colors inside the plot.

I recognize that there is already a way to do this in 2D, inside the method ax.plot() or ax.scatter(), but trying to do the same didn't work with ax.plot_surface(X, Y, Z, label = 'mylabel')

The full script is below :


from mpl_toolkits import mplot3d
from mpl_toolkits.mplot3d import Axes3D
import matplotlib.pyplot as plt
import numpy as np


fig = plt.figure()
ax = plt.axes(projection='3d')

plt.rcParams['legend.fontsize'] = 10


# First constraint
g2 = np.linspace(-5,5,2)
g3 = np.linspace(-5,5,2)
G2,G3 = np.meshgrid(g2,g3)
G4_1 = -1.18301270189222 - 0.5*G2 + 0.5*G3
ax = fig.gca(projection='3d')
c1 = ax.plot_surface(G2, G3, G4_1, label = "c1")

# Second
G3, G4 = np.meshgrid(g2, g3)
G2 = G3
c2 = ax.plot_surface(G2, G3, G4, label = "c2")

# Third
G2,G3 = np.meshgrid(g2,g3)
G4 = (0.408248290463863*G2 + 0.408248290463863*G3 -0.707106781186548)/1.63299316185545
c3 = ax.plot_surface(G2, G3, G4, label = "c3")

# And forth
G4 = (1.04903810567666 - (0.288675134594813*G2 + 0.288675134594813*G3))/0.577350269189626
c4 = ax.plot_surface(G2, G3, G4, label="c4")



ax.legend() # -> error : 'AttributeError: 'Poly3DCollection' object has no attribute '_edgecolors2d''


# labeling the figure
fig.suptitle("Constraints")
#plt.xlabel('g2', fontsize=14)
#plt.ylabel('g3', fontsize=14)
ax.set_xlabel(r'$g_2$', fontsize=15, rotation=60)
ax.set_ylabel('$g_3$', fontsize=15, rotation=60)
ax.set_zlabel('$g_4$', fontsize=15, rotation=60)
plt.savefig('Constraints.jpg')
plt.show()

Which results in the following figure.

plot

As you might have seen, there is no way to tell which surface belongs to which constraint, and what I want to achieve is a legend, like here.

I read through the answer of this question, but it didn't work here since I have multiple surfaces. After trying it, it keeps showing only one label, not four.

So my question is, is there a way to add a legend to my ax.plot_surface or any other suitable hack?

2 Answers 2

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This is an update to @Gio's answer. As of matplotlib 3.3.3, _facecolors3d and _edgecolors3d do not exist. So, instead of this:

c1._facecolors2d = c1._facecolors3d
c1._edgecolors2d = c1._edgecolors3d

that would lead to a similar AttributeError, try this:

c1._facecolors2d = c1._facecolor3d
c1._edgecolors2d = c1._edgecolor3d

I had to make this an answer, instead of a comment, due to low rep.

7

There you go.

The solution was in this error here: ax.legend() # -> error : 'AttributeError: 'Poly3DCollection' object has no attribute '_edgecolors2d''.
I believe it's a bug.

If you explore any of your surface objects (let say c1) you can see that they have the attribute '_edgecolors3d', which is what should be called when creating the legend.

So we simply create a new attribute named '_edgecolors2d' with the same content as '_edgecolors3d'.

Once the '_edgecolors2d' problem is solved you will encounter a new one with '_facecolors2d'. We repeat the same procedure and we are done.


fig = plt.figure()
ax = plt.axes(projection='3d')

plt.rcParams['legend.fontsize'] = 10


# First constraint
g2 = np.linspace(-5,5,2)
g3 = np.linspace(-5,5,2)
G2,G3 = np.meshgrid(g2,g3)
G4_1 = -1.18301270189222 - 0.5*G2 + 0.5*G3
ax = fig.gca(projection='3d')
c1 = ax.plot_surface(G2, G3, G4_1, label = "c1")
c1._facecolors2d=c1._facecolors3d
c1._edgecolors2d=c1._edgecolors3d

# Second
G3, G4 = np.meshgrid(g2, g3)
G2 = G3
c2 = ax.plot_surface(G2, G3, G4, label = "c2")
c2._facecolors2d=c2._facecolors3d
c2._edgecolors2d=c2._edgecolors3d

# Third
G2,G3 = np.meshgrid(g2,g3)
G4 = (0.408248290463863*G2 + 0.408248290463863*G3 -0.707106781186548)/1.63299316185545
c3 = ax.plot_surface(G2, G3, G4, label = "c3")
c3._facecolors2d=c3._facecolors3d
c3._edgecolors2d=c3._edgecolors3d

# And forth
G4 = (1.04903810567666 - (0.288675134594813*G2 + 0.288675134594813*G3))/0.577350269189626
c4 = ax.plot_surface(G2, G3, G4, label="c4")

c4._facecolors2d=c4._facecolors3d
c4._edgecolors2d=c4._edgecolors3d

ax.legend() # -> error : 'AttributeError: 'Poly3DCollection' object has no attribute '_edgecolors2d''


# labeling the figure
fig.suptitle("Constraints")
#plt.xlabel('g2', fontsize=14)
#plt.ylabel('g3', fontsize=14)
ax.set_xlabel(r'$g_2$', fontsize=15, rotation=60)
ax.set_ylabel('$g_3$', fontsize=15, rotation=60)
ax.set_zlabel('$g_4$', fontsize=15, rotation=60)
plt.savefig('Constraints.jpg')
plt.show()

output

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