"To RESHAPE the number of elements must not change" error during plot

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Hayao
Hayao on 24 Jun 2017
Commented: Hayao on 25 Jun 2017
Dear all,
I have a function (1x1 symfun) S4(t) with a variable of t. It's a very very long expression so I cannot write them here but it is a multi-exponential function.
Then I did:
t = 0:0.0000001:0.00002
y = S4(t)
plot(t,y)
However, I got "To RESHAPE the number of elements must not change". I have no idea where this came from because I have never used the command RESHAPE. Also, the first time around, when S4(t) was a slightly more compact function and rest of the script exactly the same, I did not have this issue.
I think the command "y = S4(t)" is the problem, but I don't see why it's not good. What am I doing wrong?
Thank you
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Jan
Jan on 25 Jun 2017
Ah, the partially contained message might mean, that this is a problem of sym/disp, so only the display in the command window is affected? Then try to supress this output using a semicolon.
Hayao
Hayao on 25 Jun 2017
As far as I know, with the command "y = S4(t)" after t being defined "0:0000001:0.00002", y should out put all S4(t) corresponding to the defined t. The output window did not even attempt this and instead returned an error. The diary also does not show this and returns an error before the output.
So I believe that it's not the output suppression problem. I think, as others have said, could be overflow or something. I've sent the entire script to Walter Roberson. So I guess I'll wait for what he can tell me.

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Accepted Answer

dpb
dpb on 24 Jun 2017
"S4(t)" is symbolic and a (very) long character expression whereas "t" is double vector. plot is trying to turn them both into column vectors but they're not of commensurate lengths so it aborts.
You can try to convert the symbolic expression to numeric first but if it is so long it may not succeed; you may need to reformulate your problem to use numeric solution rather than explicit symbolic. Doing so would probably also reduce your calculation time by orders of magnitude.
  2 Comments
Hayao
Hayao on 24 Jun 2017
Edited: Hayao on 24 Jun 2017
I am a little bit reluctant in using numeric solution. I am using system of 135 linear differential equation to solve this under matrix eigenvalue problem formulation. Since I am changing the "concentration of luminescent center" to compare the result, the comparison should be of small difference, so I am afraid that I lose the precision required for the comparison when I used numeric solution.
Also, I don't know how to obtain numeric solution to such large system of differential equation.
Do you think vpa would work?
dpb
dpb on 24 Jun 2017
"Do you think vpa would work?"
No, not really, I don't. What have you got to lose to try, however, you've reached/exceeded the limits of practicality and crashed symbolics this way.
I suspect you're going to have to reformulate the solution technique rather than being able to brute-force a direct solution.

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