How to solve a nonlinear least squares with 3 variables

10 views (last 30 days)
% I would like to find u=[ u(1); u(2); u(3)]; size(u)=3-by-1;
"rho" and "rho2" are also functions of "u" and all scalar values and defined as below.
rho=norm(s-u) % s is a known 3-by-1 vector; so rho is Euclidian distance between s and u, i.e. sqrt((s(1)-u(1))^2+(s(2)-u(2))^2+(s(3)-u(3))^2).
rho2=a'*(s-u)/norm(s-u); % a is a known 3-by-1 vector
Does anyone know how to minimize the functin below?
h-G*u-Q*rho-R*rho2 ; % h is 4-by-1 kown matrix; G is a 4-by-3 kown matrix; and Q, R all are 4-by-1 kown matrix;
Actually I wanated to solve h-G*u-Q*rho-R*rho2=0 but it is overdetermined. So the nonlinear least squares method can be applied to this problem.
Thanks,

Accepted Answer

Pratyush Roy
Pratyush Roy on 1 Dec 2021
Hi John,
The lsqonlin can be used to solve non linear least squares problems numerically.
The following code snippet might be helpful:
u0 = rand([3,1]);
s = rand([3,1]);
a = randi(10,[3,1]);
h = rand([4,1]);
G = rand([4,3]);
Q = rand([4,1]);
R = rand([4,1]);
f1 = @(u)(h-G*u-Q*norm(s-u)+R*a'*(s-u)./norm(s-u));
x = lsqnonlin(f1,u0)
Hope this helps!

More Answers (0)

Categories

Find more on Systems of Nonlinear Equations in Help Center and File Exchange

Products


Release

R2021a

Community Treasure Hunt

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

Start Hunting!