Parameter optimization for a model that relates two datasets
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Andrew Johnson
am 2 Okt. 2014
Kommentiert: Andrew Johnson
am 8 Okt. 2014
Hello! This is a seemingly simple problem I have been stuck on for some time now. I would greatly appreciate any ideas or help!
I have a model of the form:
Y = A*X^-1 + B*X^4*F(X)
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A and B are unknown parameters.
Y is a measured frequency distribution dataset of the form (Y(i), f(Y(i))).
X is another measured frequency distribution dataset (X(i), g(X(i))).
F is a known (albeit complicated) function of X.
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I would like to find values for A and B such that the right hand side of the function transforms the frequency distribution (X,g(X)) into something that looks very nearly like the measured (Y,f(Y)).
I have tried a nested for-loop "brute-force" method which tests all combinations of A and B within reasonable bounds, but it has proven too sensitive to the discretization scale chosen for A and B. Is there any matlab solution to this sort of problem? Thank you in advance!
Andrew
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Jeremy Kemmerer
am 2 Okt. 2014
Do you know for certain that the parameters A and B exist? It sounds like you may have an underdetermined system.
One quick thing to try is to form a matrix Z with three columns: Y, X^-1, and X^4*F(X) and check the rank of the matrix using the function “ rank ”.
If Z is full rank (rank is equal to 3 in this case), this tells you that the columns are not linearly dependent, and hence the parameters you are looking for won’t exist.
For more information on the command “ rank ”, please see the documentation pages: http://www.mathworks.com/help/matlab/ref/rank.html
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