doc/LeastSquares.dox - eigen - Git at Google

 namespace Eigen {

 /** \eigenManualPage LeastSquares Solving linear least squares systems

 This page describes how to solve linear least squares systems using %Eigen. An overdetermined system
 of equations, say \a Ax = \a b, has no solutions. In this case, it makes sense to search for the
 vector \a x which is closest to being a solution, in the sense that the difference \a Ax - \a b is
 as small as possible. This \a x is called the least square solution (if the Euclidean norm is used).

 The three methods discussed on this page are the SVD decomposition, the QR decomposition and normal
 equations. Of these, the SVD decomposition is generally the most accurate but the slowest, normal
 equations is the fastest but least accurate, and the QR decomposition is in between.

 \eigenAutoToc


 \section LeastSquaresSVD Using the SVD decomposition

 The \link BDCSVD::solve() solve() \endlink method in the BDCSVD class can be directly used to
 solve linear squares systems. It is not enough to compute only the singular values (the default for
 this class); you also need the singular vectors but the thin SVD decomposition suffices for
 computing least squares solutions:

 <table class="example">
 <tr><th>Example:</th><th>Output:</th></tr>
 <tr>
   <td>\include TutorialLinAlgSVDSolve.cpp </td>
   <td>\verbinclude TutorialLinAlgSVDSolve.out </td>
 </tr>
 </table>

 This is example from the page \link TutorialLinearAlgebra Linear algebra and decompositions \endlink.
 If you just need to solve the least squares problem, but are not interested in the SVD per se, a
 faster alternative method is CompleteOrthogonalDecomposition.


 \section LeastSquaresQR Using the QR decomposition

 The solve() method in QR decomposition classes also computes the least squares solution. There are
 three QR decomposition classes: HouseholderQR (no pivoting, fast but unstable if your matrix is
 not rull rank), ColPivHouseholderQR (column pivoting, thus a bit slower but more stable) and
 FullPivHouseholderQR (full pivoting, so slowest and slightly more stable than ColPivHouseholderQR).
 Here is an example with column pivoting:

 <table class="example">
 <tr><th>Example:</th><th>Output:</th></tr>
 <tr>
   <td>\include LeastSquaresQR.cpp </td>
   <td>\verbinclude LeastSquaresQR.out </td>
 </tr>
 </table>


 \section LeastSquaresNormalEquations Using normal equations

 Finding the least squares solution of \a Ax = \a b is equivalent to solving the normal equation
 <i>A</i><sup>T</sup><i>Ax</i> = <i>A</i><sup>T</sup><i>b</i>. This leads to the following code

 <table class="example">
 <tr><th>Example:</th><th>Output:</th></tr>
 <tr>
   <td>\include LeastSquaresNormalEquations.cpp </td>
   <td>\verbinclude LeastSquaresNormalEquations.out </td>
 </tr>
 </table>

 This method is usually the fastest, especially when \a A is "tall and skinny". However, if the
 matrix \a A is even mildly ill-conditioned, this is not a good method, because the condition number
 of <i>A</i><sup>T</sup><i>A</i> is the square of the condition number of \a A. This means that you
 lose roughly twice as many digits of accuracy using the normal equation, compared to the more stable
 methods mentioned above.

 */

 }
	namespace Eigen {

	/** \eigenManualPage LeastSquares Solving linear least squares systems

	This page describes how to solve linear least squares systems using %Eigen. An overdetermined system
	of equations, say \a Ax = \a b, has no solutions. In this case, it makes sense to search for the
	vector \a x which is closest to being a solution, in the sense that the difference \a Ax - \a b is
	as small as possible. This \a x is called the least square solution (if the Euclidean norm is used).

	The three methods discussed on this page are the SVD decomposition, the QR decomposition and normal
	equations. Of these, the SVD decomposition is generally the most accurate but the slowest, normal
	equations is the fastest but least accurate, and the QR decomposition is in between.

	\eigenAutoToc


	\section LeastSquaresSVD Using the SVD decomposition

	The \link BDCSVD::solve() solve() \endlink method in the BDCSVD class can be directly used to
	solve linear squares systems. It is not enough to compute only the singular values (the default for
	this class); you also need the singular vectors but the thin SVD decomposition suffices for
	computing least squares solutions:

	<table class="example">
	<tr><th>Example:</th><th>Output:</th></tr>
	<tr>
	<td>\include TutorialLinAlgSVDSolve.cpp </td>
	<td>\verbinclude TutorialLinAlgSVDSolve.out </td>
	</tr>
	</table>

	This is example from the page \link TutorialLinearAlgebra Linear algebra and decompositions \endlink.
	If you just need to solve the least squares problem, but are not interested in the SVD per se, a
	faster alternative method is CompleteOrthogonalDecomposition.


	\section LeastSquaresQR Using the QR decomposition

	The solve() method in QR decomposition classes also computes the least squares solution. There are
	three QR decomposition classes: HouseholderQR (no pivoting, fast but unstable if your matrix is
	not rull rank), ColPivHouseholderQR (column pivoting, thus a bit slower but more stable) and
	FullPivHouseholderQR (full pivoting, so slowest and slightly more stable than ColPivHouseholderQR).
	Here is an example with column pivoting:

	<table class="example">
	<tr><th>Example:</th><th>Output:</th></tr>
	<tr>
	<td>\include LeastSquaresQR.cpp </td>
	<td>\verbinclude LeastSquaresQR.out </td>
	</tr>
	</table>


	\section LeastSquaresNormalEquations Using normal equations

	Finding the least squares solution of \a Ax = \a b is equivalent to solving the normal equation
	<i>A</i><sup>T</sup><i>Ax</i> = <i>A</i><sup>T</sup><i>b</i>. This leads to the following code

	<table class="example">
	<tr><th>Example:</th><th>Output:</th></tr>
	<tr>
	<td>\include LeastSquaresNormalEquations.cpp </td>
	<td>\verbinclude LeastSquaresNormalEquations.out </td>
	</tr>
	</table>

	This method is usually the fastest, especially when \a A is "tall and skinny". However, if the
	matrix \a A is even mildly ill-conditioned, this is not a good method, because the condition number
	of <i>A</i><sup>T</sup><i>A</i> is the square of the condition number of \a A. This means that you
	lose roughly twice as many digits of accuracy using the normal equation, compared to the more stable
	methods mentioned above.

	*/

	}