Solving complex linear equations with conjugate operations
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Shengfan Bi
le 10 Mar 2024
Commenté : Shengfan Bi
le 30 Avr 2024
Consider the following equations:
Assuming and , substitute them to equations
The real parts and imaginary parts correspondingly equate:
Regarding as unknowns, rearrange to obtain the linear system form .
The result is (using ):
My questions:
1. For complex linear equations involving conjugate operations, is it necessary to calculate them separately?
2. This is just an example. I intend to use this approach to address other similar systems of complex linear equations. In my calculations for other instances, I found the determinant of to be 1e-6, approximately zero. How should I handle this to ensure the accuracy of the equation solutions?
My MATLAB code is attached below.
clc;clear;close all;
%% Set a question
z_1_true=4+2i;%The true value of z1
z_2_true=5+3i;
ee1=z_1_true+z_2_true;%Constant term
ee2=conj(z_1_true)+2*z_2_true-z_1_true;
%% taking the real part and the imaginary part respectively, twice the number of equations
syms z_1 [2 1] real%z1
syms z_2 [2 1] real%z2
z1_com=z_1(1)+1i*z_1(2);%z1_com represents the complex form of z1
z2_com=z_2(1)+1i*z_2(2);
eqns2_com=[z1_com+z2_com-ee1;
conj(z1_com)+2*z2_com-z1_com-ee2];%Construct complex equation
eqns2=[real(eqns2_com)==0;imag(eqns2_com)==0];%Taking the real part and the imaginary part
vars=[reshape(z_1,1,2),reshape(z_2,1,2)];%The variables need to be solved
[A2,b2] = equationsToMatrix(eqns2,vars);%Extract the A and b matrices
Sol2=double(A2)\double(b2);%calculation method
z1_sol2=Sol2(1)+1i*Sol2(2);z2_sol2=Sol2(3)+1i*Sol2(4);
E11=z1_sol2+z2_sol2-ee1;
E22=conj(z1_sol2)+2*z2_sol2-z1_sol2-ee2;
disp('Solve separately:');
disp(['true value of z1:', num2str(z_1_true),',result:',num2str(z1_sol2),',Error of first equation:',num2str(E11)]);
disp(['true value of z2:', num2str(z_2_true),',result:',num2str(z2_sol2),',Error of second equation:',num2str(E22)]);
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David Goodmanson
le 10 Mar 2024
Modifié(e) : David Goodmanson
le 10 Mar 2024
Hello SB,
Any way you look at it you have four independent unknown quantities, but there is some choice of their form. For the linear system Af = g, for the unknowns you can use f = [z1; z2; z1*; z2*] instead of [x1; x2; y1; y2].
This leads to (by inspection)
A = [1 1 0 0
0 0 1 1
-1 2 1 0
1 0 -1 2]
g = [9+5i; 9-5i; 10+2i; 10-2i]
f = A\g
f =
4.0000 + 2.0000i
5.0000 + 3.0000i
4.0000 - 2.0000i
5.0000 - 3.0000i
as you would expect. IF A has real coefficients (as in this case), then the second row of A is merely the first row, only with A(1,1:2) swapped with A(1,3:4). The same is true of the fourth row, consisting of A(3,1:2) swapped with A(3,3:4). If you want to find A using symbolic variables it ought to be doable (although I am staying on the sidelines).
To check the matrix for how close it is to being singular, it's better to use cond instead of det. In this cases llike this where all the matrix elements are on the order of 1, det is probably all right, but unlike det, cond has does not have the same scaling issues. And if A is close to being singular, that fact really has very little to do with complex --> real part + imaginary part etc.; or whatever method is used.
5 commentaires
David Goodmanson
le 26 Avr 2024
Hi SB,
I'm not sure how it could turn out that way, since the x,y variables and the z,z* variables are related by basically a similarity transformation on A. If you have
A*x = b
with all those quantities real, then let
z = T * x
[z1 ] [ 1 i 0 0] [x1]
[z1*] = [ 1 -i 0 0] * [y1]
[z2 ] [ 0 0 1 i] [x2]
[z2*] [ 0 0 1 -i] [y2]
and
x = T^(-1) * z
[x1] [ 1 1 0 0] [z1 ]
[y1] = (1/2) [ -i i 0 0] * [z1*] matrix is T^(-1)
[x2] [ 0 0 1 1] [z2 ]
[y2] [ 0 0 -i i] [z2*]
then
A*x = b
z = T*x
x = T^(-1) *z
so
T*A*T^(-1) *z = T*b
and it seems kind of inevitable that z1, z1*, z2, z2* end up as correct complex conjugates.
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