dlib/examples/optimization_ex.cpp

230 lines
9.6 KiB
C++
Executable File

// The contents of this file are in the public domain. See LICENSE_FOR_EXAMPLE_PROGRAMS.txt
/*
This is an example illustrating the use the optimization routines from
the dlib C++ Library.
The library provides implementations of the conjugate gradient,
BFGS, L-BFGS, and BOBYQA optimization algorithms. These algorithms allow
you to find the minimum of a function of many input variables.
This example walks though a few of the ways you might put these
routines to use.
*/
#include "dlib/optimization.h"
#include <iostream>
using namespace std;
using namespace dlib;
// ----------------------------------------------------------------------------------------
// Here we just make a typedef for a variable length column vector of doubles.
typedef matrix<double,0,1> column_vector;
// ----------------------------------------------------------------------------------------
// Below we create a few functions. When you get down into main() you will see that
// we can use the optimization algorithms to find the minimums of these functions.
// ----------------------------------------------------------------------------------------
double rosen ( const column_vector& m)
/*
This function computes what is known as Rosenbrock's function. It is
a function of two input variables and has a global minimum at (1,1).
So when we use this function to test out the optimization algorithms
we will see that the minimum found is indeed at the point (1,1).
*/
{
const double x = m(0);
const double y = m(1);
// compute Rosenbrock's function and return the result
return 100.0*pow(y - x*x,2) + pow(1 - x,2);
}
// This is a helper function used while optimizing the rosen() function.
const column_vector rosen_derivative ( const column_vector& m)
/*!
ensures
- returns the gradient vector for the rosen function
!*/
{
const double x = m(0);
const double y = m(1);
// make us a column vector of length 2
column_vector res(2);
// now compute the gradient vector
res(0) = -400*x*(y-x*x) - 2*(1-x); // derivative of rosen() with respect to x
res(1) = 200*(y-x*x); // derivative of rosen() with respect to y
return res;
}
// ----------------------------------------------------------------------------------------
class test_function
{
/*
This object is an example of what is known as a "function object" in C++.
It is simply an object with an overloaded operator(). This means it can
be used in a way that is similar to a normal C function. The interesting
thing about this sort of function is that it can have state.
In this example, our test_function object contains a column_vector
as its state and it computes the mean squared error between this
stored column_vector and the arguments to its operator() function.
This is a very simple function. However, in general you could compute
any function you wanted here. An example of a typical use would be
to find the parameters to some regression function that minimized
the mean squared error on a set of data. In this case the arguments
to the operator() function would be the parameters of your regression
function and you would use those parameters to loop over all your data
samples, compute the output of the regression function given those
parameters, and finally return a measure of the error. The dlib
optimization functions would then be used to find the parameters that
minimized the error.
*/
public:
test_function (
const column_vector& input
)
{
target = input;
}
double operator() ( const column_vector& arg) const
{
// return the mean squared error between the target vector and the input vector
return mean(squared(target-arg));
}
private:
column_vector target;
};
// ----------------------------------------------------------------------------------------
int main()
{
// make a column vector of length 2
column_vector starting_point;
starting_point.set_size(2);
cout << "Find the minimum of the rosen function()" << endl;
// Set the starting point to (4,8). This is the point the optimization algorithm
// will start out from and it will move it closer and closer to the function's
// minimum point. So generally you want to try and compute a good guess that is
// somewhat near the actual optimum value.
starting_point = 4, 8;
// Now we use the find_min() function to find the minimum point. The first argument
// to this routine is the search strategy we want to use. The second argument is the
// stopping strategy. Below I'm using the objective_delta_stop_strategy() which just
// says that the search should stop when the change in the function being optimized
// is small enough.
// The other arguments to find_min() are the function to be minimized, its derivative,
// then the starting point, and the last is an acceptable minimum value of the rosen()
// function. That is, if the algorithm finds any inputs to rosen() that gives an output
// value <= -1 then it will stop immediately. Usually you supply a number smaller than
// the actual global minimum. So since the smallest output of the rosen function is 0
// we just put -1 here which effectively causes this last argument to be disregarded.
find_min(bfgs_search_strategy(), // Use BFGS search algorithm
objective_delta_stop_strategy(1e-7), // Stop when the change in rosen() is less than 1e-7
&rosen, &rosen_derivative, starting_point, -1);
// Once the function ends the starting_point vector will contain the optimum point
// of (1,1).
cout << starting_point << endl;
// Now lets try doing it again with a different starting point and the version
// of find_min() that doesn't require you to supply a derivative function.
// This version will compute a numerical approximation of the derivative since
// we didn't supply one to it.
starting_point = -94, 5.2;
find_min_using_approximate_derivatives(bfgs_search_strategy(),
objective_delta_stop_strategy(1e-7),
&rosen, starting_point, -1);
// Again the correct minimum point is found and stored in starting_point
cout << starting_point << endl;
// Here we repeat the same thing as above but this time using the L-BFGS
// algorithm. L-BFGS is very similar to the BFGS algorithm, however, BFGS
// uses O(N^2) memory where N is the size of the starting_point vector.
// The L-BFGS algorithm however uses only O(N) memory. So if you have a
// function of a huge number of variables the L-BFGS algorithm is probably
// a better choice.
starting_point = 4, 8;
find_min(lbfgs_search_strategy(10), // The 10 here is basically a measure of how much memory L-BFGS will use.
objective_delta_stop_strategy(1e-7),
&rosen, &rosen_derivative, starting_point, -1);
cout << starting_point << endl;
starting_point = -94, 5.2;
find_min_using_approximate_derivatives(lbfgs_search_strategy(10),
objective_delta_stop_strategy(1e-7),
&rosen, starting_point, -1);
cout << starting_point << endl;
// Now lets look at using the test_function object with the optimization
// functions.
cout << "\nFind the minimum of the test_function" << endl;
column_vector target;
target.set_size(4);
starting_point.set_size(4);
// This variable will be used as the target of the test_function. So,
// our simple test_function object will have a global minimum at the
// point given by the target. We will then use the optimization
// routines to find this minimum value.
target = 3, 5, 1, 7;
// set the starting point far from the global minimum
starting_point = 1,2,3,4;
find_min_using_approximate_derivatives(bfgs_search_strategy(),
objective_delta_stop_strategy(1e-7),
test_function(target), starting_point, -1);
// At this point the correct value of (3,6,1,7) should be found and stored in starting_point
cout << starting_point << endl;
// Now lets try it again with the conjugate gradient algorithm.
starting_point = -4,5,99,3;
find_min_using_approximate_derivatives(cg_search_strategy(),
objective_delta_stop_strategy(1e-7),
test_function(target), starting_point, -1);
cout << starting_point << endl;
// Finally, lets try the BOBYQA algorithm. This is a technique specially
// designed to minimize a function in the absence of derivative information.
// Generally speaking, it is the method of choice if derivatives are not available.
starting_point = -4,5,99,3;
find_min_bobyqa(test_function(target),
starting_point,
9, // number of interpolation points
uniform_matrix<double>(4,1, -1e100), // lower bound constraint
uniform_matrix<double>(4,1, 1e100), // upper bound constraint
10, // initial trust region radius
1e-6, // stopping trust region radius
100 // max number of objective function evaluations
);
cout << starting_point << endl;
}