# MATLAB pcolor/surf bilinear interpolation (shading interp)

Consider the following MATLAB code:

``````C = [ 0 0 0 0 0
0 1 2 1 0
0 2 4 2 0
0 1 2 1 0
0 0 0 0 0 ];
pcolor( C );
axis square
``````

Note that `C` is invariant under 90 degree rotations. Also note this sentence from the help for `pcolor`:

With shading interp, each cell is colored by bilinear interpolation of the colors at its four vertices, using all elements of C.

However, the plotted image is as follows: Note that the image is not invariant under 90 degree rotations (consider e.g. the four corners). Now, unless I horribly misunderstand bilinear interpolation, this must be wrong. MATLAB seems to be interpolating on triangles, which is not the same as bilinear interpolation.

Is there any way of working round this MATLAB bug, and getting correct bilinear interpolation? (Other than manually interpolating additional points myself, which still would not cure the issue if one zoomed in far enough.)

• Interesting to note that this gives the exact same coloring as `surf(C); shading('interp'); view(2);` – jodag Nov 18 '17 at 15:57
• Yes. It's clearly forming a grid of triangles. Some MATLAB programmer didn't understand what bilinear interpolation is. – cfp Nov 18 '17 at 20:43
• Do I understand correctly: you don't want to use the resulting figure just for illustration purposes (so you could just interpolate yourself and use a 300dpi png of reasonable size), but rather do some further analysis on it? If so, I'd say you should give latex/tikz a try. Have you considered it? – thewaywewalk Nov 22 '17 at 16:36
• I am after a publication quality image. So I would rather save in a vector format and be sure that it's going to scale arbitrarily well. This is not actually targeting LaTeX, though MATLAB's EPS/PDF output is actually more of a pain than its EMF/SVG output. In any case, however the figure is exported (even if e.g. matlab2tikz is used), it will preserve the incorrect interpolation. – cfp Nov 23 '17 at 20:13

I remember having read a few threads concerning this weird behavior in the official Matlab forums, in the past. Unfortunately, I found none right now with a quick search. Anyway... you aren't the first used pointing out that `shading interp`, used in combination with with `pcolor`, behaves in a weird manner, creating shapes that don't reflect the underlying data.

The main problem is that `shading interp` interpolates between data points without caring about how sensible your grid is to smoothing. If you want a result that doesn't look jagged, you have to provide data sampled at a higher resolution:

``````C = [
0 0 0 0 0
0 1 2 1 0
0 2 4 2 0
0 1 2 1 0
0 0 0 0 0
];
C = interp2(C,5,'cubic');

pcolor(C); 