6x6 system of multivariate quadratic equations ... non-negative real solutions

조회 수: 5 (최근 30일)
Michal
Michal 2024년 11월 1일
편집: Bruno Luong 2024년 11월 5일
What is the best way (what solver?) to effectively find real non-negative solutions of 6 multivariate quadratic equations (6 variables)?
f_i(x) = 0, i = 1,6, where x = [x1,x2,...,x6] and f_i(x) is the quadratic form with known real coeffs.
  댓글 수: 9
이전 댓글 7개 표시
Walter Roberson
Walter Roberson 2024년 11월 4일
To confirm, you have the form:
syms x [6 1]
syms A [6 6]
A = diag(diag(A))
x' * A * x
Bruno Luong
Bruno Luong 2024년 11월 4일
"A always contains only one non-zero diagonal element on the ith row/column "
To me it means
Ai(j,j) == 0 is true for i ~= j and
false for i == j.

댓글을 달려면 로그인하십시오.

이 질문에 답변하려면 로그인하십시오.

채택된 답변

Bruno Luong
Bruno Luong 2024년 11월 4일
편집: Bruno Luong 2024년 11월 4일
Assuming the equations are
x' * Ai * x + bi'*x + ci = 0 for i = 1,2, ..., N = 6.
Ai are assumed to be symmetric. If not replace with Asi := 1/2*(Ai + Ai').
You could try to iteratively solve linearized problem; in pseudo code:
x = randn(N,1); % or your solution of previous step, slowly changing as stated
L = zeros(N);
r = zeros(N,1);
notconverge = true;
while notconverge
for i = 1:N
L(i,:) = (2*x'*Ai + bi');
r(i) = -(x'*Ai*x + bi'*x + ci);
end
dx = L \ r;
xold = x;
x = x + dx;
x = max(x,0); % since we want solution >= 0
notconverge = norm(x-xold,p) > tolx && ...
norm(r,q) > tolr; % select p, q, tolx and tolr approproately
end
I guess fmincon, fsolve do somesort of Newton-like or linearization internally. But still worth to investogate. Here the linearization is straight forward and fast to compute. Some intermediate vectors in computing L and r are common and can be shared.
  댓글 수: 3
이전 댓글 1개 표시
Michal
Michal 2024년 11월 4일
편집: Michal 2024년 11월 4일
Because in my case is ci = 0, then r(i)= 0 for x = 0 and i = 1,2, ..., 6
So, in a case of all negative components of x, is then dx = L\r = 0 and convergence of the Newton iterations is broken. Am I right?
Bruno Luong
Bruno Luong 2024년 11월 4일
편집: Bruno Luong 2024년 11월 5일
x = 0 is ONE solution (up to 2^6 in the worst case). You have Newton actually converges to a local minima of ONE solution. Bravo.
You need to change
x = randn(N,1);
so as it would converge to a desired solution.

댓글을 달려면 로그인하십시오.

추가 답변 (2개)

Aquatris
Aquatris 2024년 11월 1일
fsolve seems to work for most cases, if not lsqnonlin is also an option. here is a general explanation
  댓글 수: 2
Michal
Michal 2024년 11월 1일
Frankly, I hope there might be some more specialized solver for quadratic forms.
John D'Errico
John D'Errico 2024년 11월 1일
@Michal
No. There is not. We all want for things that are not possible. Probably more likely to hope for peace in the world. Yeah, right.

댓글을 달려면 로그인하십시오.

Torsten
Torsten 2024년 11월 1일
이동: Torsten 2024년 11월 1일
I think there is no specialized solver for a system of quadratic equations. Thus a general nonlinear solver ("fsolve","lsqnonlin","fmincon") is the only chance you have.
  댓글 수: 3
이전 댓글 1개 표시
Torsten
Torsten 2024년 11월 1일
편집: Torsten 2024년 11월 1일
You shouldn't think about speed at the moment. You are lucky if you get your system solved and if the solution is as expected. A system of quadratic equations is a challenge.
If this works satisfactory, you can save time if you set the solution of the last call to the nonlinear solver to the initial guess of the next call (since you say that your coefficients vary slowly).
Michal
Michal 2024년 11월 1일
편집: Michal 2024년 11월 1일
Yes... you are definitely right :)

댓글을 달려면 로그인하십시오.

카테고리

Help CenterFile Exchange에서 Systems of Nonlinear Equations에 대해 자세히 알아보기

태그

제품


릴리스

R2024b

Community Treasure Hunt

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

Start Hunting!

Translated by