"Linear" algorithm for griddedInterpolant

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David Epstein
David Epstein on 23 Jul 2018
Commented: David Epstein on 23 Jul 2018
Try this
M=rand(2,3);
disp(M);
F=griddedInterpolant(M);
disp([F(1,1),F(1.5,2.5),F(2,3),F(50,19),F(-50,19)]);
What is the mysterious algorithm used by Mathworks that gives the two final answers? I need an F with predictable answers.
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Adam
Adam on 23 Jul 2018
What do you mean by 'predictable'? You get the same answer every time for the same inputs (i.e. obviously not creating a random input every time).
(50,19) and (-50,19) are both miles away from the input matrix though so that is a lot of extrapolation needed to get there. I don't see what is especially unpredictable about it though other than the fact that extrapolating that far from your data will always be so inaccurate as to be totally unreliable.

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Accepted Answer

Jan
Jan on 23 Jul 2018
Edited: Jan on 23 Jul 2018
Of course the output is predictable and even exactly defined as expected. If you extrapolate the values, the marginal linear segments are expanded. This is the intuitive behavior. So what exactly is the problem with griddedInterpolant? What do you expect instead?
The 'ExtrapolationMethod' is explained here: doc griddedInterpolant: Extrapolation (link)
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Steven Lord
Steven Lord on 23 Jul 2018
The easiest way to have the result of the extrapolation be zero is to specify that you don't want extrapolation then replace the missing values in the result of evaluating the griddedInterpolant (represented as NaN) with 0 using fillmissing or isnan.
David Epstein
David Epstein on 23 Jul 2018
Default imrotate works differently from default griddedInterpolant. imrotate gives black corners on a 45 degree rotation of a square graphics matrix, whereas, if you use griddedInterpolant, the corners, after rotation, will probably be brighter than anywhere else. The difference remains when you instruct both functions to use the linear method. The documentation has nothing to say about this, which is what puzzled me, and explains why I asked on the forum.
On another point, my objection to your method is that I think it produces a discontinuous function on the plane, anathema to a mathematician. Padding with zeros before applying griddedInterpolant produces a continuous function. The amount of padding needed depends on the interpolation algorithm.

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