fit function not iterating

조회 수: 17 (최근 30일)
George Peterson
George Peterson 2021년 7월 30일
편집: Matt J 2021년 8월 6일
I am attempting to fit a set of data with a custom function. The fit function uses my fitoptions.startpoint data, but then stops and spits out bad fit statistics.
datax = [-7.00100000000000
-6.95600000000000
-6.90600000000000
-6.85600000000000
-6.80600000000000
-6.75600000000000
-6.70700000000000
-6.65700000000000
-6.60700000000000
-6.55700000000000
-6.50700000000000
-6.45700000000000
-6.40700000000000
-6.35700000000000
-6.30700000000000
-6.25700000000000
-6.20700000000000
-6.15800000000000
-6.10800000000000
-6.05800000000000
-6.00900000000000
-5.96300000000000
-5.91400000000000
-5.86400000000000
-5.81300000000000
-5.76400000000000
-5.71300000000000
-5.66300000000000
-5.61400000000000
-5.56300000000000
-5.51400000000000
-5.46400000000000
-5.41400000000000
-5.36400000000000
-5.31400000000000
-5.26400000000000
-5.21500000000000
-5.16400000000000
-5.11000000000000
-5.06000000000000
-5.00900000000000
-4.96500000000000
-4.91600000000000
-4.86500000000000
-4.81600000000000
-4.76500000000000
-4.71600000000000
-4.66600000000000
-4.61600000000000
-4.56500000000000
-4.51600000000000
-4.46500000000000
-4.41600000000000
-4.36700000000000
-4.31700000000000
-4.26700000000000
-4.21700000000000
-4.16600000000000
-4.11700000000000
-4.06700000000000
-4.01700000000000
-3.97200000000000
-3.92200000000000
-3.87200000000000
-3.82300000000000
-3.77300000000000
-3.72300000000000
-3.67300000000000
-3.62300000000000
-3.57300000000000
-3.52300000000000
-3.47300000000000
-3.42300000000000
-3.37300000000000
-3.32300000000000
-3.27400000000000
-3.22400000000000
-3.17400000000000
-3.12400000000000
-3.07400000000000
-3.02500000000000
-2.97900000000000
-2.93000000000000
-2.88000000000000
-2.82900000000000
-2.77900000000000
-2.73000000000000
-2.67900000000000
-2.63000000000000
-2.58000000000000
-2.53100000000000
-2.48100000000000
-2.43100000000000
-2.38100000000000
-2.33100000000000
-2.28100000000000
-2.23100000000000
-2.18200000000000
-2.13200000000000
-2.08200000000000
-2.03200000000000
-1.98700000000000
-1.93700000000000
-1.88700000000000
-1.83700000000000
-1.78700000000000
-1.73700000000000
-1.68700000000000
-1.63700000000000
-1.58700000000000
-1.53700000000000
-1.48700000000000
-1.43700000000000
-1.38700000000000
-1.33700000000000
-1.28700000000000
-1.23800000000000
-1.18900000000000
-1.13900000000000
-1.08900000000000
-1.03900000000000
-0.994000000000000
-0.944000000000000
-0.894000000000000
-0.845000000000000
-0.795000000000000
-0.745000000000000
-0.695000000000000
-0.645000000000000
-0.595000000000000
-0.545000000000000
-0.495000000000000
-0.445000000000000
-0.395000000000000
-0.345000000000000
-0.295000000000000
-0.245000000000000
-0.196000000000000
-0.146000000000000
-0.0960000000000000
-0.0460000000000000]
datay = [4.75700000000000e-12
4.71700000000000e-12
4.72400000000000e-12
4.72900000000000e-12
4.78700000000000e-12
4.79900000000000e-12
4.80800000000000e-12
4.82000000000000e-12
4.83300000000000e-12
4.83900000000000e-12
4.85700000000000e-12
4.86400000000000e-12
4.87500000000000e-12
4.88800000000000e-12
4.89700000000000e-12
4.91300000000000e-12
4.92600000000000e-12
4.93600000000000e-12
4.94500000000000e-12
4.96200000000000e-12
4.96700000000000e-12
4.95200000000000e-12
4.96200000000000e-12
4.97800000000000e-12
5.02100000000000e-12
5.03100000000000e-12
5.05500000000000e-12
5.06200000000000e-12
5.07600000000000e-12
5.09100000000000e-12
5.10200000000000e-12
5.11400000000000e-12
5.13300000000000e-12
5.15000000000000e-12
5.15900000000000e-12
5.18000000000000e-12
5.19300000000000e-12
5.20600000000000e-12
5.22500000000000e-12
5.19200000000000e-12
5.23500000000000e-12
5.25500000000000e-12
5.26900000000000e-12
5.29000000000000e-12
5.30400000000000e-12
5.31900000000000e-12
5.33900000000000e-12
5.35300000000000e-12
5.36700000000000e-12
5.38800000000000e-12
5.42200000000000e-12
5.42200000000000e-12
5.44800000000000e-12
5.46600000000000e-12
5.47800000000000e-12
5.50300000000000e-12
5.52000000000000e-12
5.54000000000000e-12
5.56300000000000e-12
5.58500000000000e-12
5.60400000000000e-12
5.63700000000000e-12
5.65400000000000e-12
5.67600000000000e-12
5.70200000000000e-12
5.72600000000000e-12
5.74200000000000e-12
5.77600000000000e-12
5.79700000000000e-12
5.81600000000000e-12
5.84700000000000e-12
5.86500000000000e-12
5.88800000000000e-12
5.91300000000000e-12
5.93900000000000e-12
5.96700000000000e-12
5.99600000000000e-12
6.02300000000000e-12
6.05200000000000e-12
6.08100000000000e-12
6.10800000000000e-12
6.09100000000000e-12
6.12100000000000e-12
6.14700000000000e-12
6.18200000000000e-12
6.21000000000000e-12
6.23500000000000e-12
6.27800000000000e-12
6.30500000000000e-12
6.34700000000000e-12
6.37900000000000e-12
6.41800000000000e-12
6.46000000000000e-12
6.49300000000000e-12
6.53100000000000e-12
6.60700000000000e-12
6.65300000000000e-12
6.69100000000000e-12
6.73700000000000e-12
6.78200000000000e-12
6.82900000000000e-12
6.86500000000000e-12
6.91400000000000e-12
6.96000000000000e-12
7.01300000000000e-12
7.06300000000000e-12
7.11500000000000e-12
7.17300000000000e-12
7.22400000000000e-12
7.28000000000000e-12
7.34100000000000e-12
7.40100000000000e-12
7.46600000000000e-12
7.53200000000000e-12
7.59800000000000e-12
7.67100000000000e-12
7.74500000000000e-12
7.81400000000000e-12
7.89500000000000e-12
7.97900000000000e-12
8.05900000000000e-12
8.11800000000000e-12
8.20900000000000e-12
8.30600000000000e-12
8.41100000000000e-12
8.53900000000000e-12
8.62900000000000e-12
8.76400000000000e-12
8.88700000000000e-12
8.99100000000000e-12
9.13700000000000e-12
9.28600000000000e-12
9.45000000000000e-12
9.62000000000000e-12
9.79700000000000e-12
9.99300000000000e-12
1.02000000000000e-11
1.04290000000000e-11
1.06980000000000e-11
1.09840000000000e-11
1.12850000000000e-11]
CJ_fittype = fittype('11.8.*8.85e-12.*area./((((m+2).*11.8.*8.85e-12)./(1.602e-19.*beta).*(Vbi-Va)).^(1./(m+2)))',...
'coefficients',{'Vbi','area','beta','m'},'independent',{'Va'})
CJ_fitoptions = fitoptions(CJ_fittype)
CJ_fitoptions.StartPoint = [0.7 5.2e-5 1e19 1];
CJ_fitoptions.Lower = [0.2 5.2e-9 1e10 0];
CJ_fitoptions.Upper = [1.2 5.2e-3 1e24 3];
[curveFit1,curveGOF1] = fit(datax,datay,CJ_fittype,CJ_fitoptions)
As I stated earlier, the fit function runs once with the initial guess, and provides a 95% confidence bound for m, but does not for Vbi, area, or beta. I have attempted to change the other fitoptions tolerances and robust settings. I have verified my equation is input correctly. I believe the remaining "coefficients" should be unique. But I need to run through this process about 100 more times, and not having to manually iterate each fit would be nice. Any help or suggestions would be appreciated.
Thank you,
George
  댓글 수: 4
이전 댓글 2개 표시
Alex Sha
Alex Sha 2021년 7월 31일
The result is not bad:
Root of Mean Square Error (RMSE): 1.63940860716371E-14
Sum of Squared Residual: 3.78960141955188E-26
Correlation Coef. (R): 0.999942423834309
R-Square: 0.999884850983632
Parameter Best Estimate
---------- -------------
vbi 0.533035313889232
area 1185.68913752864
beta 0.00136089634095781
m 0.9485721118
George Peterson
George Peterson 2021년 8월 3일
Alex,
I agree that your fit is not bad. But for some reason, your attempted fit has gone through multiple iterations instead of spitting out the calculation from the fitoptions.Startpoint. So my question is what did you do to get the fit function to run multiple times where my attempt was a single iteration? What were your exact commands to Matlab?
Thank you,
George

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답변 (1개)

Matt J
Matt J 2021년 7월 30일
편집: Matt J 2021년 7월 30일
You should adjust your units for both the x,y data and for the parameters so that the datay are not so uniformly close to 0 and so you don't have such disparate orders of magnitudes among your parameters like 0.2 versus 1e24. Note that double floating point arithemetic can only keep track of 16 different orders of mangitude.
It would be best if all the data and all the parameters were within 6 orders of magnitude of each other or so.
  댓글 수: 5
이전 댓글 3개 표시
George Peterson
George Peterson 2021년 8월 3일
Matt,
I appreciate your input, but beta and area should be unique. CJ should be linearly dependent on Area, and should be inversely proportional to beta as 1/(m+2).
But this does not address my real issue, which is why is the fit function not iterating. I can make my initial guess quite close, and get an r-squared value from the GOF of 0.993 or better, or far away, getting an r-squared of 0.4 or less, but something is triggering an exit from the function such that the coefficients never alter from the fitoptions.Startpoint values. And if I do not include the fitoptions.Startpoint values, fit makes a random guess, exits, and provides the calculated GOF at the initial random guess.
Thank you,
George
Matt J
Matt J 2021년 8월 3일
편집: Matt J 2021년 8월 6일
Ran in:
The reason it is not iterating is because, over a very broad neighborhood of your StartPoint, your rmse=2.2836e-13 is miniscule and also changes in your parameters result in similarly miniscule changes in rmse. With, default stopping tolerances like CJ_fitoptions.TolFun=1e-6, the code interprets this to mean that you are already at an optimum point and no iterations need be done.
The reason your rmse and its gradients are (artificially) miniscule is, in part, because they are scaled to be on the order of 1e-12. If you take even the simplest step of changing the scale of your datay, as I have been suggesting, you will see the iterations start to move. Below, all I have done is scale both your datay and your model function by 1e11, and as you can see 17 iterations are executed:
load data
CJ_fittype = fittype('1e11*11.8.*8.85e-12.*area./((((m+2).*11.8.*8.85e-12)./(1.602e-19.*beta).*(Vbi-Va)).^(1./(m+2)))',...
'coefficients',{'Vbi','area','beta','m'},'independent',{'Va'});
CJ_fitoptions = fitoptions(CJ_fittype);
CJ_fitoptions.StartPoint = [0.7 5.2e-5 1e19 1];
CJ_fitoptions.Lower = [0.2 5.2e-9 1e10 0];
CJ_fitoptions.Upper = [1.2 5.2e-3 1e24 3];
[curveFit1,curveGOF1,output] = fit(datax,1e11*datay,CJ_fittype,CJ_fitoptions)
curveFit1 =
General model: curveFit1(Va) = 1e11*11.8.*8.85e-12.*area./((((m+2).*11.8.*8.85e-12)./(1.602e- 19.*beta).*(Vbi-Va)).^(1./(m+2))) Coefficients (with 95% confidence bounds): Vbi = 0.533 area = 4.551e-05 beta = 1e+19 m = 0.9486 (0.9329, 0.9642)
curveGOF1 = struct with fields:
sse: 3.7896e-04 rsquare: 0.9999 dfe: 137 adjrsquare: 0.9999 rmse: 0.0017
output = struct with fields:
numobs: 141 numparam: 4 residuals: [141×1 double] Jacobian: [141×4 double] exitflag: 1 firstorderopt: 1.9974e-07 iterations: 17 funcCount: 90 cgiterations: 0 algorithm: 'trust-region-reflective' stepsize: 3.4011e-06 message: 'Success. Fitting converged to a solution.'

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