Weighted least squares: Difference between revisions
imported>Igor Grešovnik (added Problem statement) |
imported>Igor Grešovnik |
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==Problem statement== | ==Problem statement== | ||
Consider the problem of adjusting a model function to best fit a data set. The chosen model function has a set of adjustable parameters '''a'''. The data set consist of ''n'' points | Consider the problem of adjusting a model function to best fit a given data set. The chosen model function has a set of adjustable parameters '''a'''. The data set consist of ''n'' points | ||
:<math>(y_i,\bold{x}_i), i = 1, 2,\dots, n .</math> | :<math>(y_i,\bold{x}_i), i = 1, 2,\dots, n .</math> | ||
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:<math>y=f(\bold{x};\bold{a}) ,</math> | :<math>y=f(\bold{x};\bold{a}) ,</math> | ||
where ''y'' is the dependent variable, '''x''' are the independent variables, and '''a''' are the adjustable parameters of the model. We wish to find the values of these parameters such that the model best fits the data according to a defined error criterion. The least squares method minimizes the sum of squares of errors, | where ''y'' is the dependent variable, '''x''' are the independent variables, and '''a''' are the adjustable parameters of the model. We wish to find the values of these parameters such that the model best fits the data according to a defined error criterion. The least squares method minimizes the weighted sum of squares of errors, | ||
:<math> S(a) = \sum_{i=1}^n w_i (y_i - f(\bold{x}_i;\bold{a}))^2 ,</math> | :<math> S(a) = \sum_{i=1}^n w_i (y_i - f(\bold{x}_i;\bold{a}))^2 ,</math> | ||
with respect to the adjustable parameters of the model '''a'''. | with respect to the adjustable parameters of the model '''a'''. | ||
== See also == | == See also == |
Revision as of 22:26, 23 November 2007
Weighted least squares is a method of linear regression similar to the ordinary least squares method, except that points are weighted, which causes that some points have greater effect on the approximation than the others. The weighted least squares method is particularly important in function approximation and in estimation of model parameters from measured data.
Problem statement
Consider the problem of adjusting a model function to best fit a given data set. The chosen model function has a set of adjustable parameters a. The data set consist of n points
The model function has the form
where y is the dependent variable, x are the independent variables, and a are the adjustable parameters of the model. We wish to find the values of these parameters such that the model best fits the data according to a defined error criterion. The least squares method minimizes the weighted sum of squares of errors,
with respect to the adjustable parameters of the model a.