using matlab least squares functions

조회 수: 5 (최근 30일)
Kate
Kate 2013년 9월 27일
댓글: Matt J 2013년 10월 4일
Hello,
I have my matlab code which solves a least squares problem and gives me the right answer. My code is below. I explicitly use my own analytically-derived Jacobian and so on. I just purchased the Optimization toolbox. Can anyone perhaps show me how my code can be used via the functions provided by the Optimization toolbox such as lsqnonlin and so on.
thank you.
%=========== MY least squares ==============%
clc;clear all;close all
beep off
X = [-0.734163292085050,-0.650030660496880;-0.734202821328435,-0.650069503240265;-0.738931528235336,-0.660060466119060;-0.737943703068185,-0.670101503002962;-0.736799998431314,-0.680143905314235;]
Y = [-0.736371316036657,-0.661615260180661;-0.736372829883012,-0.661616774027016;-0.736552116163647,-0.662004318693837;-0.736510559472223,-0.662391863360658;-0.736462980793180,-0.662779408027478;]
Z = X;
nit=1000
w2 =10
stopnow=false;
w1 = 1;
Zo = Z;
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Create kd-tree
kd = KDTreeSearcher(Y);
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Initialize linear system ||D^0.5(Av - b)||_2^2
% A is the Jacobian
% D is a weight matrix
dim = size(Z,1)*size(Z,2);
A = sparse(2*dim, dim+3);
A(1:dim,1:dim) = speye(dim,dim);
A((1+dim):end,1:dim) = speye(dim,dim);
A((1+dim):(dim+dim/2), end-1) = -ones(dim/2,1);
A((1+dim+dim/2):end, end) = -ones(dim/2,1);
b = zeros(2*dim,1)
D = sparse(2*dim, 2*dim);
D(1:dim,1:dim) = w1*speye(dim,dim);
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
for it=1:nit
it;
if(stopnow)
return;
end;
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% kd-tree look-up
idz = knnsearch(kd,Z);
P = Y(idz,:);
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Build linear system
b(1:dim) = reshape(P,dim,1);
b((1+dim):end) = reshape(X,dim,1);
Xr = X;
Xr(:,1) = -Xr(:,1);
Xr = fliplr(Xr);
A((1+dim):end,end-2) = reshape(Xr,dim,1);
D((dim+1):end,(dim+1):end) = w2*speye(dim,dim);
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Solve Least Squares
v = (A'*D*A)\(A'*D*b);
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Extract solution
Z = reshape(v(1:dim), size(X,1), size(X,2));
theta = v(end-2);
R = [cos(theta), -sin(theta); sin(theta) cos(theta)];
X = X*R' + repmat(v((end-1):end)', [size(X,1),1]);
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
% Stopping Criteria
if(norm(Z-Zo)/size(Z,1) < 1e-6)
break;
end;
Zo = Z;
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
end

채택된 답변

Matt J
Matt J 2013년 9월 27일
편집: Matt J 2013년 9월 27일
Since your problem is simple unconstrainted linear least squares, it looks like the Optimization Toolbox would be overkill. Instead of
v = (A'*D*A)\(A'*D*b);
however, it might be better to do
v=lscov(A,b,D);
or
Ds=sqrt(D);
v=(Ds*A)\(Ds*b);
  댓글 수: 23
Kate
Kate 2013년 10월 4일
Hi matt,
did you get an opportunity to have a look?
please let me know when you do.
cheers kate
Matt J
Matt J 2013년 10월 4일
편집: Matt J 2013년 10월 4일
Kate, I probably won't get to it, but I recommend that you look at the exitflag and other diagnostic output arguments from fmincon to see how well the optimization succeeded. As a further test, I also recommend that you set up an ideal simulated X,Y data for which the solution Z,R,t is known and see if the objective function evaluates to 0 at the ideal solution.

댓글을 달려면 로그인하십시오.

추가 답변 (0개)

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by