ACCEPTED SOLUTION
Accepted Solutions
I think the conclusion so far is that you are better off using genfit or a solve block as opposed to expfit or you may fiddle around with the guesses.
I don't know if this would be an option but it looks to me that a modified exponential f(x)=a*exp(b/x) might make an equal good if not even a better fit and is only dependent on two parameters (BTW, as you can see in the pic, even changing the guess 1 to 2 makes expfit work OK):
I have no explanation (other than we are dealing with a numerical algorithm trying to fins a local(!!) minimum and so depends on the guess values) so but of course you can change the behaviour by changing the guess vector. Replace the 1 there for a 10(even 2 dows the job) and your second example gives you the result you expect.
Exchange the 1 for 0.1 in the the first example and it will give you the same undesired result.
I understand thats its quite demanding how to generate appropriate guesses in a bulk processing.
You may provide a few different guesses and calculate the Error (least squares) for the fit you get with each of them and then keep the best.
I also noticed that genfit seems to do a better job (at least with your second example).
Maybe a solve block with minerr does even better. At least you get the error immediately by evaluating the system variable ERR after the solve block.
I think the conclusion so far is that you are better off using genfit or a solve block as opposed to expfit or you may fiddle around with the guesses.
I don't know if this would be an option but it looks to me that a modified exponential f(x)=a*exp(b/x) might make an equal good if not even a better fit and is only dependent on two parameters (BTW, as you can see in the pic, even changing the guess 1 to 2 makes expfit work OK):
Interesting observation - so the solve block is affected by TOL but expfit seems to be not.
I don't think that you should abandon you solve block - it might be that the constraint a[1 < 0 can be necessary for other data sets.
I am not sure if it better to use minerr (for which I have a tendency to) or minerr as you did. The results are marginally different and minerr seems not to be dependent on TOL.
For the two datasets given the constraint a[1<0 would not be necessary and if I change that to a[1 > 0 is has no effect at all ? 😞
