imaginary value from solution nonlinier least square
2 visualizaciones (últimos 30 días)
Mostrar comentarios más antiguos
im trying to fitting data from reflectance measurement with lavenberg marquardt algorithm , ive got this code LMFnlsq in file exchange but i dont understand how to use it in my case
here is the equation
R = (0.6/(a + b))*(sqrt(3*a*(a + b))+(1/c))*(exp(-sqrt(3*a*(a + b ))*c))/(c^2)
a and b is parameter that im trying to solve
R is known vector from measurement reflectance
c is known vector from distance in measurement
im using the code like this
r = [0.8 0.9 1.0 1.1 1.2 1.3 1.4 1.6]';
data = [0.787357544 0.63199586 0.393109753 0.271890049 0.179074593 0.133498607 0.112568249 0.05274273]';
res = @(x) ((0.6./(x(1)+x(2))).*(sqrt(3.*x(1).*(x(1)+x(2)))+(1./r)).* (exp(-sqrt(3*x(1).*(x(1)+x(2)))*r))./(r.^2)) - data;
x0 = [0.1,10];
[x,ssq,cnt] = LMFnlsq(res,x0)
hold on
plot(r,data)
plot(r,res(x)+ data,'y'), grid
the problem is it sure did the iteration but the final value is in imaginary solution like this
x =
0.0528 - 0.2730i
1.1469 + 0.6248i
ssq =
0.0091
cnt =
29
anything wrong with the code?
0 comentarios
Respuesta aceptada
Miroslav Balda
el 12 de Mzo. de 2013
Let us reformulate the problem:
data = (q + 1./r).*exp(-r*q).*(0.6/(p(1)*r.^2)),
where
q = sqrt(p(2));
The problem may be solved without any troubles by introducing a penalty function
(q<=0)*w
into vector of residuals. Thus, the main script could be
% Surpan.m Application of LMFnlsq
%%%%%%%%%%% 12. 3. 2013
% Answers: Imaginary value from solution nonlinear least square
clc
clear all
close all
%
global data r p0 w
%
data = [0.779543143 0.624771688 0.387776261 0.266986051 0.174732672 ...
0.130313689 0.110540421 0.051412959]'; % column vector
r = [0.8 0.9 1 1.1 1.2 1.3 1.4 1.6]'; % column vector
w = 10;
%
while 1
% function inp from www.mathworks.com/matlabcentral/fileexchange/9033
w = inp('weight', w); % weight of penalty function
if w<=0, break, end
p0 = rand(2,1);
[p,ssq,cnt] = LMFnlsq(@resid,ones(2,1),'Display',-100,'MaxIter',1e3);
p = p.*p0;
a = p(2)/(3*p(1))
b = p(1)-a
res = resid(p./p0);
plot(r,data,'o-', r,res(1:end-1)+data,'-or')
end
The function for evaluating residuals has the form:
function res = resid(p) % Residuals of Surpans' equations
%%%%%%%%%%%%%%%%%%%%%%%%%
global data r w p0
%
p = p.*p0; % p(1) = (a+b)
q = sqrt(p(2)); % q = sqrt(3*a*(a+b))
%
res = [(q + 1./r).*exp(-r*q).*(0.6./(p(1)*r.^2)) - data
(q>=0)*w % penalty function
];
The nonlinear fit is made by the function LMFnlsq, which may be found on
www.mathworks.com/matlabcentral/fileexchange/17534
0 comentarios
Más respuestas (1)
Matt J
el 28 de Feb. de 2013
You have square roots in your function, which will produce complex values when their argument goes negative. You must use another algorithm, one that lets you constrain 3*a*(a + b))+(1/c) to a strictly positive lower bound.
4 comentarios
Matt J
el 28 de Feb. de 2013
but i must solve it with lavenberg marquardt algorithm
Meaning it's an assignment? Then get clarification from the one who assigned it to you. LM is not applicable to constrained problems.
Ver también
Categorías
Más información sobre Systems of Nonlinear Equations en Help Center y File Exchange.
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!