how can I solve the same optimization problem by adding the constraints ...?
The constraint is already satisfied by the solution that you have. What will it accomplish to formalize the constraint in the optimization?
Optimization based line fitting
조회 수: 11 (최근 30일)
이전 댓글 표시
Hello!
I am using the following optimization script by which I am fitting the following curve 
between two points 
and 
between two points and My question is, how can I solve the same optimization problem by adding the constraints 
?
?clc;
clear;
tic
%The Data: Time and response data
t = [0 10]';
y = [1 7]';
%Look at the Data
subplot(2,1,1)
plot(t,y,'*','MarkerSize',10)
grid on
xlabel('Time')
ylabel('Response')
hold on
%Curve to Fit
E = [ones(size(t)) exp(-t)]
%Solving constrained linear least squares problem
% cNew = lsqlin(E,y,[],[],[1 1],y(1),[],[],[],opt) % Solver-based approach
p = optimproblem;
c = optimvar('c',2);
p.ObjectiveSense = 'minimize';
p.Objective = sum((E*c-y).^2);
% constraint example: p.Constraints.intercept = c(1) + c(2) == 0.82
sol = solve(p);
cNew = sol.c;
tf = (0:0.1:10)';
Ef = [ones(size(tf)) exp(-tf)];
yhatc = Ef*cNew;
%plot the curve\
subplot(2,1,2)
plot(t,y,'*','MarkerSize',10)
grid on
xlabel('Time')
ylabel('Response')
hold on
plot(tf,yhatc)
title('y(t)=c_1 + c_2e^{-t}')
toc
채택된 답변
Matt J
2021년 4월 27일
편집: Matt J
2021년 4월 27일
p = optimproblem;
c = optimvar('c',2);
p.ObjectiveSense = 'minimize';
p.Objective = sum((E*c-y).^2);
p.Constraints=[1,exp(-5)]*c>=4;
sol = solve(p);
댓글 수: 1
Simon Reclapino
2021년 6월 25일
Thanks for your support. @Matt J
Could you also please help me in setting a constraint on the derivative. e.g. 
. However, if you'd like to, you can take a look on the detailed question in the link
. However, if you'd like to, you can take a look on the detailed question in the link 추가 답변 (0개)
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