I have points in 3D space and their corresponding 2D image points. How can I make a mesh out of the 3D points, then texture the triangle faces formed by the mesh?
2 Answers
Note that the function trisurf
that you were originally trying to use returns a handle to a patch object. If you look at the 'FaceColor'
property for patch objects, you can see that there is no 'texturemap'
option. That option is only valid for the 'FaceColor'
property of surface objects. You will therefore have to find a way to plot your triangular surface as a surface object instead of a patch object. Here are two ways to approach this:
If your data is in a uniform grid...
If the coordinates of your surface data represent a uniform grid such that z
is a rectangular set of points that span from xmin
to xmax
in the xaxis and ymin
to ymax
in the yaxis, you can plot it using surf
instead of trisurf
:
Z = ... % NbyM matrix of data
x = linspace(xmin, xmax, size(Z, 2)); % xcoordinates for columns of Z
y = linspace(ymin, ymax, size(Z, 1)); % ycoordinates for rows of Z
[X, Y] = meshgrid(x, y); % Create meshes for x and y
C = imread('image1.jpg'); % Load RGB image
h = surf(X, Y, Z, flipdim(C, 1), ... % Plot surface (flips rows of C, if needed)
'FaceColor', 'texturemap', ...
'EdgeColor', 'none');
axis equal
In order to illustrate the results of the above code, I initialized the data as Z = peaks;
, used the builtin sample image 'peppers.png'
, and set the x
and y
values to span from 1 to 16. This resulted in the following texturemapped surface:
If your data is nonuniformly spaced...
If your data are not regularly spaced, you can create a set of regularlyspaced X
and Y
coordinates (as I did above using meshgrid
) and then use one of the functions griddata
or TriScatteredInterp
to interpolate a regular grid of Z
values from your irregular set of z
values. I discuss how to use these two functions in my answer to another SO question. Here's a refined version of the code you posted using TriScatteredInterp
(Note: as of R2013a scatteredInterpolant
is the recommended alternative):
x = ... % Scattered x data
y = ... % Scattered y data
z = ... % Scattered z data
xmin = min(x);
xmax = max(x);
ymin = min(y);
ymax = max(y);
F = TriScatteredInterp(x(:), y(:), z(:)); % Create interpolant
N = 50; % Number of y values in uniform grid
M = 50; % Number of x values in uniform grid
xu = linspace(xmin, xmax, M); % Uniform xcoordinates
yu = linspace(ymin, ymax, N); % Uniform ycoordinates
[X, Y] = meshgrid(xu, yu); % Create meshes for xu and yu
Z = F(X, Y); % Evaluate interpolant (NbyM matrix)
C = imread('image1.jpg'); % Load RGB image
h = surf(X, Y, Z, flipdim(C, 1), ... % Plot surface
'FaceColor', 'texturemap', ...
'EdgeColor', 'none');
axis equal
In this case, you have to first choose the values of N
and M
for the size of your matrix Z
. In order to illustrate the results of the above code, I initialized the data for x
, y
, and z
as follows and used the builtin sample image 'peppers.png'
:
x = rand(1, 100)0.5; % 100 random values in the range 0.5 to 0.5
y = rand(1, 100)0.5; % 100 random values in the range 0.5 to 0.5
z = exp((x.^2+y.^2)./0.125); % Values from a 2D Gaussian distribution
This resulted in the following texturemapped surface:
Notice that there are jagged edges near the corners of the surface. These are places where there were too few points for TriScatteredInterp
to adequately fit an interpolated surface. The Z
values at these points are therefore nan
, resulting in the surface point not being plotted.

I'm not particular to using trisurf, as long as I get some sort of mesh, may it be a patch, surface, mesh, or etc. object type. What additional information do you need to know about the patch object?– worbelCommented Mar 21, 2010 at 21:17

@srand: I updated my answer with some general guidelines for creating a surface of regularlyspaced points from your data, whatever it may be.– gnoviceCommented Mar 21, 2010 at 23:19

@srand: I forgot that FLIPUD only operates on 2D arrays. I fixed the code using FLIPDIM instead.– gnoviceCommented Mar 22, 2010 at 3:33

I only have points in 3d space, does Z have to be continuous ? I tried it with my data and it didn't work correctly. (see updated code)– worbelCommented Mar 23, 2010 at 0:59

@srand: I added a refined version of your updated code to my answer. Hopefully that will work for what you want to do.– gnoviceCommented Mar 23, 2010 at 3:05
If your texture is already in the proper geometry you can just use regular old texture mapping.
The link to the MathWorks documentation of texture mapping: http://www.mathworks.com/access/helpdesk/help/techdoc/visualize/f018164.html#f09250
ReEDIT: Updated the code a little:
Try this approach (I just got it to work).
a=imread('image.jpg');
b=double(a)/255;
[x,y,z]=peaks(30); %# This is a surface maker that you do have
%# The matrix [x,y,z] is the representation of the surface.
surf(x,y,z,b,'FaceColor','texturemap') %# Try this with any image and you
%# should see a pretty explanatory
%# result. (Just copy and paste) ;)
So [x,y,z] is the 'surface' or rather a matrix containing a number of points in the form (x,y,z) that are on the surface. Notice that the image is stretched to fit the surface.

What does proper geometry mean? I tried [X, map] = rgb2ind(imread('image.jpg'), 128); colormap(map); but it didn't give the results I was expecting.– worbelCommented Mar 21, 2010 at 19:37

The image you are using as a 'texture' will be projected onto your surface. Imagine first that your surface is totally flat. The image is then 'printed' onto your surface, and then the surface is stretched and bent into shape.– JayCommented Mar 21, 2010 at 21:11


SupBSpline just makes a cool surface. If you are unable to use it you could just make a surface by hand.– JayCommented Mar 21, 2010 at 22:36
