Lease Square Minimization, lsqnonlin

2 vues (au cours des 30 derniers jours)
Rafa Z
Rafa Z le 26 Mai 2016
Commenté : Rafa Z le 3 Sep 2018
I am using lsqnonlin for LSM problem. I have tried both ways trust region reflective and levenberg marquart (can be changed from options). They both provided the same result. What are the difference in these methods? PS: I have 4 equations with 3 unknowns.

Connectez-vous pour répondre à cette question.

Réponses (1)

Svein Olav Hegerland
Svein Olav Hegerland le 18 Avr 2018
Hi! I know it a long time ago you posted this post, but can I have a look at your code :)? I am trilaterating using the lsqnonlin solver and would like to compare my approach to yours.
  3 commentaires
Afficher 1 commentaire plus ancien
Hussein Kwasme
Hussein Kwasme le 16 Juil 2018
Hello, Just found this discussion, I'm trying to do trilateration of a point in a 2-D plane having 4 reference points (known positions and distances to my unknown point).
Is it possible to have the code? I can solve my system with SOLVE command if I have only 3 reference points (shown in picture), but I get no solution when I add the 4th reference point.
if true
BS=3
syms x1 y1 m
% assume(x1,'real')
% assume(y1,'real')
for i = 1:2:BS
syms x1 y1
%solving the equations
m(i,:) = (((x1-anchorLoc(2,1)).^2 + (y1-anchorLoc(2,2)).^2 - (distanceNoisy(2))^2)) - ...
(((x1-anchorLoc(i,1)).^2 + (y1-anchorLoc(i,2)).^2 - (distanceNoisy(i))^2));
end
syms x1 y1
[X1,Y1] = solve(m,x1,y1);
beacon_est(1,1)=double(X1);
beacon_est(1,2)=double(Y1);
end
Rafa Z
Rafa Z le 3 Sep 2018
shoot me a message to rafaelsantos90@mail.ru; will share scripts I have.

Connectez-vous pour commenter.

Catégories

En savoir plus sur Symbolic Math Toolbox dans Help Center et File Exchange

Tags

Produits

Community Treasure Hunt

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

Start Hunting!

Translated by