Regression analysis

In statistics, regression analysis is a collective name for techniques for the modeling and analysis of numerical data consisting of values of a dependent variable (response variable) and of one or more independent variables (explanatory variables). The dependent variable in the regression equation is modeled as a function of the independent variables, corresponding parameters ("constants"), and an error term. The error term is treated as a random variable. It represents unexplained variation in the dependent variable. The parameters are estimated so as to give a "best fit" of the data. Most commonly the best fit is evaluated by using the least squares method, but other criteria have also been used.

Regression can be used for prediction (including forecasting of time-series data), inference, hypothesis testing, and modeling of causal relationships. These uses of regression rely heavily on the underlying assumptions being satisfied. Regression analysis has been criticized as being misused for these purposes in many cases where the appropriate assumptions cannot be verified to hold.^[1][2] One factor contributing to the misuse of regression is that it can take considerably more skill to critique a model than to fit a model.^[3]

The earliest form of regression was the method of least squares, which was published by Legendre in 1805,^[4] and by Gauss in 1809.^[5] The term “least squares” is from Legendre’s term, moindres carrés. However, Gauss claimed that he had known the method since 1795.

Legendre and Gauss both applied the method to the problem of determining, from astronomical observations, the orbits of bodies about the Sun. Euler had worked on the same problem (1748) without success.^{[citation needed]} Gauss published a further development of the theory of least squares in 1821,^[6] including a version of the Gauss–Markov theorem.

The term "regression" was coined in the nineteenth century to describe a biological phenomenon, namely that the progeny of exceptional individuals tend on average to be less exceptional than their parents and more like their more distant ancestors. Francis Galton, a cousin of Charles Darwin, studied this phenomenon and applied the slightly misleading term "regression towards mediocrity" to it. For Galton, regression had only this biological meaning, but his work^[7] was later extended by Udny Yule and Karl Pearson to a more general statistical context.^[8] At the present time, the term "regression" is often synonymous with "least squares curve fitting".

Classical assumptions for regression analysis include:

• The sample must be representative of the population for the inference prediction.
• The error is assumed to be a random variable with a mean of zero conditional on the explanatory variables.
• The independent variables are error-free. If this is not so, modeling may be done using errors-in-variables model techniques.
• The predictors must be linearly independent, i.e. it must not be possible to express any predictor as a linear combination of the others. See Multicollinearity.
• The errors are uncorrelated, that is, the variance-covariance matrix of the errors is diagonal and each non-zero element is the variance of the error.
• The variance of the error is constant across observations (homoscedasticity). If not, weighted least squares or other methods might be used.

These are sufficient (but not all necessary) conditions for the least-squares estimator to possess desirable properties, in particular, these assumptions imply that the parameter estimates will be unbiased, consistent, and efficient in the class of linear unbiased estimators. Many of these assumptions may be relaxed in more advanced treatments.

In linear regression, the model specification is that the dependent variable, ${\displaystyle y_{i}}$ is a linear combination of the parameters (but need not be linear in the independent variables). For example, in simple linear regression for modeling ${\displaystyle N}$ data points there is one independent variable: ${\displaystyle x_{i}}$, and two parameters, ${\displaystyle \beta _{0}}$ and ${\displaystyle \beta _{1}}$:

straight line: ${\displaystyle y_{i}=\beta _{0}+\beta _{1}x_{i}+\epsilon _{i},\quad i=1,\dots ,N\!}$

In multiple linear regression, there are several independent variables or functions of independent variables. For example, adding a term in x_i² to the preceding regression gives:

parabola: ${\displaystyle y_{i}=\beta _{0}+\beta _{1}x_{i}+\beta _{2}x_{i}^{2}+\epsilon _{i},\ i=1,\dots ,N\!}$

This is still linear regression; although the expression on the right hand side is quadratic in the independent variable ${\displaystyle x_{i}}$, it is linear in the parameters ${\displaystyle \beta _{0}}$, ${\displaystyle \beta _{1}}$ and ${\displaystyle \beta _{2}.}$

In both cases, ${\displaystyle \epsilon _{i}}$ is an error term and the subscript ${\displaystyle i}$ indexes a particular observation. Given a random sample from the population, we estimate the population parameters and obtain the sample linear regression model: ${\displaystyle y_{i}={\widehat {\beta }}_{0}+{\widehat {\beta }}_{1}X_{i}+e_{i}}$ The term ${\displaystyle e_{i}}$ is the residual, ${\displaystyle e_{i}=y_{i}-{\widehat {y}}_{i}}$. One method of estimation is ordinary least squares. This method obtains parameter estimates that minimize the sum of squared residuals, SSE:

${\displaystyle SSE=\sum _{i=1}^{N}e_{i}^{2}}$

Minimization of this function results in a set of normal equations, a set of simultaneous linear equations in the parameters, which are solved to yield the parameter estimators, ${\displaystyle {\widehat {\beta }}_{0},{\widehat {\beta }}_{1}}$. See regression coefficients for statistical properties of these estimators.

In the case of simple regression, the formulas for the least squares estimates are

${\displaystyle {\widehat {\beta _{1}}}={\frac {\sum (x_{i}-{\bar {x}})(y_{i}-{\bar {y}})}{\sum (x_{i}-{\bar {x}})^{2}}}}$ and ${\displaystyle {\hat {\beta _{0}}}={\bar {y}}-{\widehat {\beta _{1}}}{\bar {x}}}$

where ${\displaystyle {\bar {x}}}$ is the mean (average) of the ${\displaystyle x}$ values and ${\displaystyle {\bar {y}}}$ is the mean of the ${\displaystyle y}$ values. See linear least squares(straight line fitting) for a derivation of these formulas and a numerical example. Under the assumption that the population error term has a constant variance, the estimate of that variance is given by: ${\displaystyle {\hat {\sigma _{\varepsilon }}}={\sqrt {\frac {SSE}{N-2}}}}$ This is called the root mean square error (RMSE) of the regression. The standard errors of the parameter estimates are given by

${\displaystyle {\hat {\sigma }}_{\beta _{0}}={\hat {\sigma }}_{\varepsilon }{\sqrt {{\frac {1}{N}}+{\frac {{\bar {x}}^{2}}{\sum (x_{i}-{\bar {x}})^{2}}}}}}$

${\displaystyle {\hat {\sigma }}_{\beta _{1}}={\hat {\sigma }}_{\varepsilon }{\sqrt {\frac {1}{\sum (x_{i}-{\bar {x}})^{2}}}}}$

Under the further assumption that the population error term is normally distributed, the researcher can use these estimated standard errors to create confidence intervals and conduct hypothesis tests about the population parameters.

In the more general multiple regression model, there are p independent variables: ${\displaystyle y_{i}=\beta _{0}+\beta _{1}x_{1i}+\cdots +\beta _{p}x_{pi}+\varepsilon _{i},}$ The least square parameter estimates are obtained by p normal equations. The residual can be written as

${\displaystyle e_{i}=y_{i}-{\hat {\beta }}_{0}-{\hat {\beta }}_{1}x_{1}-\cdots -{\hat {\beta }}_{p}x_{p}}$

The normal equations are

${\displaystyle \sum _{i=1}^{N}\sum _{k=1}^{p}X_{ij}X_{ik}{\hat {\beta }}_{k}=\sum _{i=1}^{N}X_{ij}y_{i},\ j=1,\dots ,p\,}$

In matrix notation, the normal equations are written as

${\displaystyle \mathbf {\left(X^{T}X\right){\hat {\boldsymbol {\beta }}}=X^{T}y} }$

For a numerical example see linear regression (example)

Once a regression model has been constructed, it may be important to confirm the goodness of fit of the model and the statistical significance of the estimated parameters. Commonly used checks of goodness of fit include the R-squared, analyses of the pattern of residuals and hypothesis testing. Statistical significance can be checked by an F-test of the overall fit, followed by t-tests of individual parameters.

Interpretations of these diagnostic tests rest heavily on the model assumptions. Although examination of the residuals can be used to invalidate a model, the results of a t-test or F-test are sometimes more difficult to interpret if the model's assumptions are violated. For example, if the error term does not have a normal distribution, in small samples the estimated parameters will not follow normal distributions, which complicates inference. With relatively large samples, however, a central limit theorem can be invoked such that hypothesis testing may proceed using asymptotic approximations.

The response variable may be non-continuous ("limited" to lie on some subset of the real line). For binary (zero or one) variables, if analysis proceeds with least-squares linear regression, the model is called the linear probability model. Nonlinear models for binary dependent variables include the probit and logit model. The multivariate probit model makes it possible to estimate jointly the relationship between several binary dependent variables and some independent variables. For categorical variables with more than two values there is the multinomial logit. For ordinal variables with more than two values, there are the ordered logit and ordered probit models. Censored regression models may be used when the dependent variable is only sometimes observed, and Heckman correction type models may be used when the sample is not randomly selected from the population of interest. An alternative to such procedures is linear regression based on polychoric or polyserial correlations between the categorical variables. Such procedures differ in the assumptions made about the distribution of the variables in the population. If the variable is positive with low values and represents the repetition of the occurrence of an event, count models like the Poisson regression or the negative binomial model may be used

Regression models predict a value of the ${\displaystyle y}$ variable given known values of the ${\displaystyle x}$ variables. If the prediction is to be done within the range of values of the ${\displaystyle x}$ variables used to construct the model this is known as interpolation. Prediction outside the range of the data used to construct the model is known as extrapolation and it is more risky.

When the model function is not linear in the parameters the sum of squares must be minimized by an iterative procedure. This introduces many complications which are summarized in Differences between linear and non-linear least squares

Although the parameters of a regression model are usually estimated using the method of least squares, other methods which have been used include:

• Bayesian methods, e.g. Bayesian linear regression
• Minimization of absolute deviations, leading to quantile regression
• Nonparametric regression. This approach requires a large number of observations, as the data are used to build the model structure as well as estimate the model parameters. They are usually computationally intensive.

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• Audi, R., Ed. (1996). "curve fitting problem," The Cambridge Dictionary of Philosophy. Cambridge, Cambridge University Press. pp.172-173.
• William H. Kruskal and Judith M. Tanur, ed. (1978), "Linear Hypotheses," International Encyclopedia of Statistics. Free Press, v. 1,

Evan J. Williams, "I. Regression," pp. 523-41.

Julian C. Stanley, "II. Analysis of Variance," pp. 541-554.

• Lindley, D.V. (1987). "Regression and correlation analysis," New Palgrave: A Dictionary of Economics, v. 4, pp. 120-23.
• Birkes, David and Yadolah Dodge, Alternative Methods of Regression. ISBN 0-471-56881-3
• Chatfield, C. (1993) "Calculating Interval Forecasts," Journal of Business and Economic Statistics, 11. pp. 121-135.
• Draper, N.R. and Smith, H. (1998).Applied Regression Analysis Wiley Series in Probability and Statistics
• Fox, J. (1997). Applied Regression Analysis, Linear Models and Related Methods. Sage
• Hardle, W., Applied Nonparametric Regression (1990), ISBN 0-521-42950-1
• Meade, N. and T. Islam (1995) "Prediction Intervals for Growth Curve Forecasts," Journal of Forecasting, 14, pp. 413-430.
• Munro, Barbara Hazard (2005) "Statistical Methods for Health Care Research" Lippincott Williams & Wilkins, 5th ed.
• Gujarati, Basic Econometrics, 4th edition
• Sykes, A.O. "An Introduction to Regression Analysis" (Inaugural Coase Lecture)
• S. Kotsiantis, D. Kanellopoulos, P. Pintelas, Local Additive Regression of Decision Stumps, Lecture Notes in Artificial Intelligence, Springer-Verlag, Vol. 3955, SETN 2006, pp. 148 – 157, 2006
• S. Kotsiantis, P. Pintelas, Selective Averaging of Regression Models, Annals of Mathematics, Computing & TeleInformatics, Vol 1, No 3, 2005, pp. 66-75

All major statistical software packages perform the common types of regression analysis correctly and in a user-friendly way. Simple linear regression can be done in some spreadsheet applications. There are a number of software programs that perform specialized forms of regression, and experts may choose to write their own code to using statistical programming languages or numerical analysis software.

• Regression Analysis
• Regression Analysis Tool Online Article on linear regression with a Regression Analysis Tool
• Curvefit: A complete guide to nonlinear regression - Online textbook
• Regression Made Easy with RM4Es
• Exegeses on Linear Models - Some comments on linear regression models by Bill Venables.
• Perpendicular Regression of a Line at MathPages
• Regression of Weakly Correlated Data - How linear regression mistakes can appear when Y-range is much smaller than X-range
• Matlab SUrrogate MOdeling Toolbox - SUMO Toolbox - Matlab code for Active Learning + Model Selection + Surrogate Model Regression
• Zunzun.com Online curve and surface fitting application