In mathematics, preconditioning is the application of a transformation, called the preconditioner, that conditions a given problem into a form that is more suitable for numerical solving methods. Preconditioning is typically related to reducing a condition number of the problem. The preconditioned problem is then usually solved by an iterative method.

Preconditioning for linear systems

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In linear algebra and numerical analysis, a preconditioner   of a matrix   is a matrix such that   has a smaller condition number than  . It is also common to call   the preconditioner, rather than  , since   itself is rarely explicitly available. In modern preconditioning, the application of  , i.e., multiplication of a column vector, or a block of column vectors, by  , is commonly performed in a matrix-free fashion, i.e., where neither  , nor   (and often not even  ) are explicitly available in a matrix form.

Preconditioners are useful in iterative methods to solve a linear system   for   since the rate of convergence for most iterative linear solvers increases because the condition number of a matrix decreases as a result of preconditioning. Preconditioned iterative solvers typically outperform direct solvers, e.g., Gaussian elimination, for large, especially for sparse, matrices. Iterative solvers can be used as matrix-free methods, i.e. become the only choice if the coefficient matrix   is not stored explicitly, but is accessed by evaluating matrix-vector products.

Description

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Instead of solving the original linear system   for  , one may consider the right preconditioned system   and solve   for   and   for  .

Alternatively, one may solve the left preconditioned system  

Both systems give the same solution as the original system as long as the preconditioner matrix   is nonsingular. The left preconditioning is more traditional.

The two-sided preconditioned system   may be beneficial, e.g., to preserve the matrix symmetry: if the original matrix   is real symmetric and real preconditioners   and   satisfy   then the preconditioned matrix   is also symmetric. The two-sided preconditioning is common for diagonal scaling where the preconditioners   and   are diagonal and scaling is applied both to columns and rows of the original matrix  , e.g., in order to decrease the dynamic range of entries of the matrix.

The goal of preconditioning is reducing the condition number, e.g., of the left or right preconditioned system matrix   or  . Small condition numbers benefit fast convergence of iterative solvers and improve stability of the solution with respect to perturbations in the system matrix and the right-hand side, e.g., allowing for more aggressive quantization of the matrix entries using lower computer precision.

The preconditioned matrix   or   is rarely explicitly formed. Only the action of applying the preconditioner solve operation   to a given vector may need to be computed.

Typically there is a trade-off in the choice of  . Since the operator   must be applied at each step of the iterative linear solver, it should have a small cost (computing time) of applying the   operation. The cheapest preconditioner would therefore be   since then   Clearly, this results in the original linear system and the preconditioner does nothing. At the other extreme, the choice   gives   which has optimal condition number of 1, requiring a single iteration for convergence; however in this case   and applying the preconditioner is as difficult as solving the original system. One therefore chooses   as somewhere between these two extremes, in an attempt to achieve a minimal number of linear iterations while keeping the operator   as simple as possible. Some examples of typical preconditioning approaches are detailed below.

Preconditioned iterative methods

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Preconditioned iterative methods for   are, in most cases, mathematically equivalent to standard iterative methods applied to the preconditioned system   For example, the standard Richardson iteration for solving   is  

Applied to the preconditioned system   it turns into a preconditioned method  

Examples of popular preconditioned iterative methods for linear systems include the preconditioned conjugate gradient method, the biconjugate gradient method, and generalized minimal residual method. Iterative methods, which use scalar products to compute the iterative parameters, require corresponding changes in the scalar product together with substituting   for  

Matrix splitting

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A stationary iterative method is determined by the matrix splitting   and the iteration matrix  . Assuming that

the condition number   is bounded above by  

Geometric interpretation

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For a symmetric positive definite matrix   the preconditioner   is typically chosen to be symmetric positive definite as well. The preconditioned operator   is then also symmetric positive definite, but with respect to the  -based scalar product. In this case, the desired effect in applying a preconditioner is to make the quadratic form of the preconditioned operator   with respect to the  -based scalar product to be nearly spherical.[1]

Variable and non-linear preconditioning

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Denoting  , we highlight that preconditioning is practically implemented as multiplying some vector   by  , i.e., computing the product   In many applications,   is not given as a matrix, but rather as an operator   acting on the vector  . Some popular preconditioners, however, change with   and the dependence on   may not be linear. Typical examples involve using non-linear iterative methods, e.g., the conjugate gradient method, as a part of the preconditioner construction. Such preconditioners may be practically very efficient, however, their behavior is hard to predict theoretically.

Random preconditioning

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One interesting particular case of variable preconditioning is random preconditioning, e.g., multigrid preconditioning on random coarse grids.[2] If used in gradient descent methods, random preconditioning can be viewed as an implementation of stochastic gradient descent and can lead to faster convergence, compared to fixed preconditioning, since it breaks the asymptotic "zig-zag" pattern of the gradient descent.

Spectrally equivalent preconditioning

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The most common use of preconditioning is for iterative solution of linear systems resulting from approximations of partial differential equations. The better the approximation quality, the larger the matrix size is. In such a case, the goal of optimal preconditioning is, on the one side, to make the spectral condition number of   to be bounded from above by a constant independent of the matrix size, which is called spectrally equivalent preconditioning by D'yakonov. On the other hand, the cost of application of the   should ideally be proportional (also independent of the matrix size) to the cost of multiplication of   by a vector.

Examples

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Jacobi (or diagonal) preconditioner

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The Jacobi preconditioner is one of the simplest forms of preconditioning, in which the preconditioner is chosen to be the diagonal of the matrix   Assuming  , we get   It is efficient for diagonally dominant matrices  . It is used in analysis software for beam problems or 1-D problems (EX:- STAAD.Pro)

SPAI

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The Sparse Approximate Inverse preconditioner minimises   where   is the Frobenius norm and   is from some suitably constrained set of sparse matrices. Under the Frobenius norm, this reduces to solving numerous independent least-squares problems (one for every column). The entries in   must be restricted to some sparsity pattern or the problem remains as difficult and time-consuming as finding the exact inverse of  . The method was introduced by M.J. Grote and T. Huckle together with an approach to selecting sparsity patterns.[3]

Other preconditioners

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Preconditioning for eigenvalue problems

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Eigenvalue problems can be framed in several alternative ways, each leading to its own preconditioning. The traditional preconditioning is based on the so-called spectral transformations. Knowing (approximately) the _targeted eigenvalue, one can compute the corresponding eigenvector by solving the related homogeneous linear system, thus allowing to use preconditioning for linear system. Finally, formulating the eigenvalue problem as optimization of the Rayleigh quotient brings preconditioned optimization techniques to the scene.[4]

Spectral transformations

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By analogy with linear systems, for an eigenvalue problem   one may be tempted to replace the matrix   with the matrix   using a preconditioner  . However, this makes sense only if the seeking eigenvectors of   and   are the same. This is the case for spectral transformations.

The most popular spectral transformation is the so-called shift-and-invert transformation, where for a given scalar  , called the shift, the original eigenvalue problem   is replaced with the shift-and-invert problem  . The eigenvectors are preserved, and one can solve the shift-and-invert problem by an iterative solver, e.g., the power iteration. This gives the Inverse iteration, which normally converges to the eigenvector, corresponding to the eigenvalue closest to the shift  . The Rayleigh quotient iteration is a shift-and-invert method with a variable shift.

Spectral transformations are specific for eigenvalue problems and have no analogs for linear systems. They require accurate numerical calculation of the transformation involved, which becomes the main bottleneck for large problems.

General preconditioning

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To make a close connection to linear systems, let us suppose that the _targeted eigenvalue   is known (approximately). Then one can compute the corresponding eigenvector from the homogeneous linear system  . Using the concept of left preconditioning for linear systems, we obtain  , where   is the preconditioner, which we can try to solve using the Richardson iteration

 

The ideal preconditioning[4]

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The Moore–Penrose pseudoinverse   is the preconditioner, which makes the Richardson iteration above converge in one step with  , since  , denoted by  , is the orthogonal projector on the eigenspace, corresponding to  . The choice   is impractical for three independent reasons. First,   is actually not known, although it can be replaced with its approximation  . Second, the exact Moore–Penrose pseudoinverse requires the knowledge of the eigenvector, which we are trying to find. This can be somewhat circumvented by the use of the Jacobi–Davidson preconditioner  , where   approximates  . Last, but not least, this approach requires accurate numerical solution of linear system with the system matrix  , which becomes as expensive for large problems as the shift-and-invert method above. If the solution is not accurate enough, step two may be redundant.

Practical preconditioning

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Let us first replace the theoretical value   in the Richardson iteration above with its current approximation   to obtain a practical algorithm  

A popular choice is   using the Rayleigh quotient function  . Practical preconditioning may be as trivial as just using   or   For some classes of eigenvalue problems the efficiency of   has been demonstrated, both numerically and theoretically. The choice   allows one to easily utilize for eigenvalue problems the vast variety of preconditioners developed for linear systems.

Due to the changing value  , a comprehensive theoretical convergence analysis is much more difficult, compared to the linear systems case, even for the simplest methods, such as the Richardson iteration.

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Preconditioning in optimization

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Illustration of gradient descent

In optimization, preconditioning is typically used to accelerate first-order optimization algorithms.

Description

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For example, to find a local minimum of a real-valued function   using gradient descent, one takes steps proportional to the negative of the gradient   (or of the approximate gradient) of the function at the current point:  

The preconditioner is applied to the gradient:  

Preconditioning here can be viewed as changing the geometry of the vector space with the goal to make the level sets look like circles.[5] In this case the preconditioned gradient aims closer to the point of the extrema as on the figure, which speeds up the convergence.

Connection to linear systems

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The minimum of a quadratic function   where   and   are real column-vectors and   is a real symmetric positive-definite matrix, is exactly the solution of the linear equation  . Since  , the preconditioned gradient descent method of minimizing   is  

This is the preconditioned Richardson iteration for solving a system of linear equations.

Connection to eigenvalue problems

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The minimum of the Rayleigh quotient   where   is a real non-zero column-vector and   is a real symmetric positive-definite matrix, is the smallest eigenvalue of  , while the minimizer is the corresponding eigenvector. Since   is proportional to  , the preconditioned gradient descent method of minimizing   is  

This is an analog of preconditioned Richardson iteration for solving eigenvalue problems.

Variable preconditioning

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In many cases, it may be beneficial to change the preconditioner at some or even every step of an iterative algorithm in order to accommodate for a changing shape of the level sets, as in  

One should have in mind, however, that constructing an efficient preconditioner is very often computationally expensive. The increased cost of updating the preconditioner can easily override the positive effect of faster convergence. If  , a BFGS approximation of the inverse hessian matrix, this method is referred to as a Quasi-Newton method.

References

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  1. ^ Shewchuk, Jonathan Richard (August 4, 1994). "An Introduction to the Conjugate Gradient Method Without the Agonizing Pain" (PDF).
  2. ^ Henricus Bouwmeester, Andrew Dougherty, Andrew V Knyazev. Nonsymmetric Preconditioning for Conjugate Gradient and Steepest Descent Methods. Procedia Computer Science, Volume 51, Pages 276-285, Elsevier, 2015. https://doi.org/10.1016/j.procs.2015.05.241
  3. ^ Grote, M. J. & Huckle, T. (1997). "Parallel Preconditioning with Sparse Approximate Inverses". SIAM Journal on Scientific Computing. 18 (3): 838–53. doi:10.1137/S1064827594276552.
  4. ^ a b Knyazev, Andrew V. (1998). "Preconditioned eigensolvers - an oxymoron?". Electronic Transactions on Numerical Analysis. 7: 104–123.
  5. ^ Himmelblau, David M. (1972). Applied Nonlinear Programming. New York: McGraw-Hill. pp. 78–83. ISBN 0-07-028921-2.

Sources

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