I'm having difficulty with a fitting problem. From the errors that I get I imagine that the boundaries are not defined correctly and I haven't managed to find a solution. Any help would be very much appreciated.
Alternative methods for the solution of the same problem are also accepted.
I have to estimate the parameters of a non-linear function of the type:
A*y(x) + B*EXP(C*y(x)) + g(x,D) = 0
subjected to the parameters
PAR = [A,B,C,D] being within the range
LB < PAR < UB
To solve the problem I'm using the Matlab functions
fzero. The simplified code used is reported below.
The problem is divided in four functions:
parameterEstimation- (a wrapper for the lsqnonlin function)
objectiveFunction_lsq- (the objective function for the param estimation)
yFun- (the function returing the value of the variable y)
objectiveFunction_zero- (the objective function of the non-linear equation used to calculate y)
Running the code on the data I get the this waring
Warning: Length of lower bounds is > length(x); ignoring extra bounds
and this error
Failure in initial user-supplied objective function evaluation. LSQNONLIN cannot continue
This makes me to think that the boundaries are not correctly used or not correctly called, but maybe the problem is elsewhere.
function Done = parameterEstimation() %read inputs Xmeas = xlsread('filepath','worksheet','range'); Ymeas = xlsread('filepath','worksheet','range'); %inital values and boundary conditions initialGuess = [1,1,1,1]; %model parameters initial guess LB = [0,0,0,0]; %model parameters lower boundaries UB = [2,2,2,2]; %model parameters upper boundaries %parameter estimation calcParam = lsqnonlin(@objectiveFunction_lsq_2,initialGuess,LB,UB,,Xmeas,Ymeas); Done = calcParam; function diff = objectiveFunction_lsq_2(PAR,Xmeas,Ymeas) y_calculated = yFun(PAR,Xmeas); diff = y_calculated-Ymeas; function result = yFun(PAR,X) y_0 = 2; val = fzero(@(y)objfun_y(y,PAR,X),y_0); result = val; function result = objfun_y(y,PAR,X) A = PAR(1); B = PAR(2); A = PAR(3); C = PAR(4); D = PAR(5); val = A*y+B*exp(y*C)+g(D,X); result = val;