solving problem for gradient descent
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hi,
I am trying to solve the following question using gradient descent method.\
.
I wrote the following code but its giving error.
function [xopt,fopt,niter,gnorm,dx] = grad_descent(varargin)
if nargin==0
% define starting point
x0 = [3 3]';
elseif nargin==1
% if a single input argument is provided, it is a user-defined starting
% point.
x0 = varargin{1};
else
error('Incorrect number of input arguments.')
end
% termination tolerance
tol = 1e-6;
% maximum number of allowed iterations
maxiter = 10;
% minimum allowed perturbation
dxmin = 1e-6;
% step size ( 0.33 causes instability, 0.2 quite accurate)
alpha = 0.1;
% initialize gradient norm, optimization vector, iteration counter, perturbation
gnorm = inf; x = x0; niter = 0; dx = inf;
% define the objective function:
f = @(x1,x2,x3) 4*[x1.^2 + x2-x3].^2 +10;
% plot objective function contours for visualization:
figure(1); clf; ezcontour(f,[-5 5 -5 5]); axis equal; hold on
% redefine objective function syntax for use with optimization:
f2 = @(x) f(x(1),x(2),x(3));
% gradient descent algorithm:
while and(gnorm>=tol, and(niter <= maxiter, dx >= dxmin))
% calculate gradient:
g = grad(x);
gnorm = norm(g);
% take step:
xnew = x - alpha*g;
% check step
if ~isfinite(xnew)
display(['Number of iterations: ' num2str(niter)])
error('x is inf or NaN')
end
% plot current point
plot([x(1) xnew(1)],[x(2) xnew(2)],'ko-')
refresh
% update termination metrics
niter = niter + 1;
dx = norm(xnew-x);
x = xnew;
end
xopt = x;
fopt = f2(xopt);
niter = niter - 1;
%define the gradient of the objective
% function g = grad(x)
% g = [2*x(1) + x(2)
% x(1) + 6*x(2)];
function g = grad(x)
g = 4*(x(1).^2 + x(2)-x(3)).^2 +10;
.I saved this code in a file called steepest.m and then I try to run the following command
[xopt,fopt,niter,gnorm,dx]=steepest
.But I get error.
I have actually used the following code (which works) to solve my problem.
function [xopt,fopt,niter,gnorm,dx] = grad_descent(varargin)
if nargin==0
% define starting point
x0 = [3 3]';
elseif nargin==1
% if a single input argument is provided, it is a user-defined starting
% point.
x0 = varargin{1};
else
error('Incorrect number of input arguments.')
end
% termination tolerance
tol = 1e-6;
% maximum number of allowed iterations
maxiter = 10;
% minimum allowed perturbation
dxmin = 1e-6;
% step size ( 0.33 causes instability, 0.2 quite accurate)
alpha = 0.1;
% initialize gradient norm, optimization vector, iteration counter, perturbation
gnorm = inf; x = x0; niter = 0; dx = inf;
% define the objective function:
f = @(x1,x2) x1.^2 + x1.*x2 + 3*x2.^2;
% plot objective function contours for visualization:
figure(1); clf; ezcontour(f,[-5 5 -5 5]); axis equal; hold on
% redefine objective function syntax for use with optimization:
f2 = @(x) f(x(1),x(2));
% gradient descent algorithm:
while and(gnorm>=tol, and(niter <= maxiter, dx >= dxmin))
% calculate gradient:
g = grad(x);
gnorm = norm(g);
% take step:
xnew = x - alpha*g;
% check step
if ~isfinite(xnew)
display(['Number of iterations: ' num2str(niter)])
error('x is inf or NaN')
end
% plot current point
plot([x(1) xnew(1)],[x(2) xnew(2)],'ko-')
refresh
% update termination metrics
niter = niter + 1;
dx = norm(xnew-x);
x = xnew;
end
xopt = x;
fopt = f2(xopt);
niter = niter - 1;
% define the gradient of the objective
function g = grad(x)
g = [2*x(1) + x(2)
x(1) + 6*x(2)];
.
This code works perfectly but why my code is not working?
please help
thanks
Accepted Answer
Prabhan Purwar
on 18 Oct 2019
Edited: Prabhan Purwar
on 18 Oct 2019
Hi,
Following code Illustrates the working of Gradient Descent for 3 variables.
To eliminate error changes were made to:
- Initial value
- Maxiter value
- Alpha value
function [xopt,fopt,niter,gnorm,dx] = grad_descent(varargin)
if nargin==0
% define starting point
x0 = [3 3 3]';
elseif nargin==1
% if a single input argument is provided, it is a user-defined starting
% point.
x0 = varargin{1};
else
error('Incorrect number of input arguments.')
end
% termination tolerance
tol = 1e-6;
% maximum number of allowed iterations
maxiter = 100000;
% minimum allowed perturbation
dxmin = 1e-6;
% step size ( 0.33 causes instability, 0.2 quite accurate)
alpha = 0.000001;
% initialize gradient norm, optimization vector, iteration counter, perturbation
gnorm = inf; x = x0; niter = 0; dx = inf;
% define the objective function:
f = @(x1,x2,x3) 4*(x1.^2 + x2-x3).^2 +10;
% plot objective function contours for visualization:
%figure(1); clf; contour3(f,[-5 5 -5 5 -5 5]); axis equal; hold on
% redefine objective function syntax for use with optimization:
f2 = @(x) f(x(1),x(2),x(3));
% gradient descent algorithm:
while and(gnorm>=tol, and(niter <= maxiter, dx >= dxmin))
% calculate gradient:
g = grad(x);
gnorm = norm(g);
% take step:
xnew = x - alpha*g;
% check step
if ~isfinite(xnew)
display(['Number of iterations: ' num2str(niter)])
error('x is inf or NaN')
end
% plot current point
%plot([x(1) xnew(1)],[x(2) xnew(2)],'ko-')
refresh
% update termination metrics
niter = niter + 1;
dx = norm(xnew-x);
x = xnew;
end
xopt = x;
fopt = f2(xopt);
niter = niter - 1;
%define the gradient of the objective
% function g = grad(x)
% g = [2*x(1) + x(2)
% x(1) + 6*x(2)];
function g = grad(x)
g = 4*(x(1).^2 + x(2)-x(3)).^2 +10;
ans =
0.3667
0.3667
0.3667
OR
Alternately make use of the following code for accurate result
fun = @(x) 4*(x(1).^2 + x(2)-x(3)).^2 +10;
x0 = [3,3,3];
x = fminsearch(fun,x0);
2 Comments
Muhammad Kundi
on 10 Dec 2019
saja mk
on 17 Sep 2020
Please,what do you mean with
"minimum allowed perturbation"
??
More Answers (1)
saja mk
on 15 Sep 2020
1 vote
at the last of the code , why
g = 4*(x(1).^2 + x(2)-x(3)).^2 +10;
you didnt grad it?
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