Least Squares with constraint on absolute value

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Hi , I need to solve a least squares values of the form
, where x is a 32x1 vector and B is a 32x32 matrix.
Howerver, x is complex and I need to constraint the solutions to make each element of vector x to have absolute value of 1.
Is that possible?
Best,

Accepted Answer

Torsten
Torsten on 16 Jun 2023
Edited: Torsten on 16 Jun 2023
rng("default")
n = 32;
y = rand(n,1) + 1i*rand(n,1);
B = rand(n) + 1i*rand(n);
x0 = rand(n,1) + 1i*rand(n,1);
x0 = [real(x0);imag(x0)];
x0 = x0./[sqrt(x0(1:n).^2+x0(n+1:2*n).^2);sqrt(x0(1:n).^2+x0(n+1:2*n).^2)];
fun = @(x)(B*(x(1:n)+1i*x(n+1:2*n))-y)'*(B*(x(1:n)+1i*x(n+1:2*n))-y);
fun(x0)
ans = 1.2661e+04
nonlcon = @(x)deal([],x(1:n).^2+x(n+1:2*n).^2-ones(n,1));
sol = fmincon(fun,x0,[],[],[],[],[],[],nonlcon,optimset('MaxFunEvals',10000,'TolFun',1e-12,'TolX',1e-12))
Local minimum possible. Constraints satisfied. fmincon stopped because the size of the current step is less than the value of the step size tolerance and constraints are satisfied to within the value of the constraint tolerance.
sol = 64×1
0.6418 -0.9517 -0.9328 -0.8359 -0.9372 0.4603 0.7496 0.8249 0.9990 -0.2242
fun(sol)
ans = 10.3184
sol(1:n).^2+sol(n+1:2*n).^2-ones(n,1)
ans = 32×1
1.0e-15 * 0 0 -0.2220 0 0 0 0 0 0 0

More Answers (1)

Matt J
Matt J on 15 Jun 2023
Edited: Matt J on 15 Jun 2023
You'll need to write the problem in terms of the real-valued components xi and xr of x,
x=xr+1i*xi
Once you do that, your absolute value constraints become quadratic,
xr^2+xi^2=1
and you can solve with fmincon.
  2 Comments
L
L on 16 Jun 2023
Edited: L on 16 Jun 2023
Than
ks for your answer.
Is this correct?
n = @(x) vecnorm( y - B*x);
A = [];
b = [];
Aeq = [];
beq = [];
lb = [];
ub = [];
nonlcon = @unity;
x0 = zeros(32,1);
x = fmincon(fun,x0,A,b,Aeq,beq,lb,ub,nonlcon)
function [c,ceq] = unity(x)
c = real(x)^2 + 1*iimg(x)^2 - 1;
ceq = [];
end

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