Introduction to olsrr

Introduction

The olsrr package provides following tools for teaching and learning OLS regression using R:

This document is a quickstart guide to the tools offered by olsrr. Other vignettes provide more details on specific topics:

Regression

ols_regress(mpg ~ disp + hp + wt + qsec, data = mtcars)
##                          Model Summary                          
## ---------------------------------------------------------------
## R                       0.914       RMSE                 2.409 
## R-Squared               0.835       MSE                  6.875 
## Adj. R-Squared          0.811       Coef. Var           13.051 
## Pred R-Squared          0.771       AIC                159.070 
## MAE                     1.858       SBC                167.864 
## ---------------------------------------------------------------
##  RMSE: Root Mean Square Error 
##  MSE: Mean Square Error 
##  MAE: Mean Absolute Error 
##  AIC: Akaike Information Criteria 
##  SBC: Schwarz Bayesian Criteria 
## 
##                                ANOVA                                 
## --------------------------------------------------------------------
##                 Sum of                                              
##                Squares        DF    Mean Square      F         Sig. 
## --------------------------------------------------------------------
## Regression     940.412         4        235.103    34.195    0.0000 
## Residual       185.635        27          6.875                     
## Total         1126.047        31                                    
## --------------------------------------------------------------------
## 
##                                   Parameter Estimates                                    
## ----------------------------------------------------------------------------------------
##       model      Beta    Std. Error    Std. Beta      t        Sig      lower     upper 
## ----------------------------------------------------------------------------------------
## (Intercept)    27.330         8.639                  3.164    0.004     9.604    45.055 
##        disp     0.003         0.011        0.055     0.248    0.806    -0.019     0.025 
##          hp    -0.019         0.016       -0.212    -1.196    0.242    -0.051     0.013 
##          wt    -4.609         1.266       -0.748    -3.641    0.001    -7.206    -2.012 
##        qsec     0.544         0.466        0.161     1.166    0.254    -0.413     1.501 
## ----------------------------------------------------------------------------------------

In the presence of interaction terms in the model, the predictors are scaled and centered before computing the standardized betas. ols_regress() will detect interaction terms automatically but in case you have created a new variable instead of using the inline function *, you can indicate the presence of interaction terms by setting iterm to TRUE.

Residual vs Fitted Values Plot

Plot to detect non-linearity, unequal error variances, and outliers.

model <- lm(mpg ~ disp + hp + wt + qsec, data = mtcars)
ols_plot_resid_fit(model)

DFBETAs Panel

DFBETAs measure the difference in each parameter estimate with and without the influential observation. dfbetas_panel creates plots to detect influential observations using DFBETAs.

model <- lm(mpg ~ disp + hp + wt, data = mtcars)
ols_plot_dfbetas(model)

Residual Fit Spread Plot

Plot to detect non-linearity, influential observations and outliers.

model <- lm(mpg ~ disp + hp + wt + qsec, data = mtcars)
ols_plot_resid_fit_spread(model)

Breusch Pagan Test

Breusch Pagan test is used to test for herteroskedasticity (non-constant error variance). It tests whether the variance of the errors from a regression is dependent on the values of the independent variables. It is a \(\chi^{2}\) test.

model <- lm(mpg ~ disp + hp + wt + drat, data = mtcars)
ols_test_breusch_pagan(model)
## 
##  Breusch Pagan Test for Heteroskedasticity
##  -----------------------------------------
##  Ho: the variance is constant            
##  Ha: the variance is not constant        
## 
##              Data               
##  -------------------------------
##  Response : mpg 
##  Variables: fitted values of mpg 
## 
##        Test Summary         
##  ---------------------------
##  DF            =    1 
##  Chi2          =    1.429672 
##  Prob > Chi2   =    0.231818

Collinearity Diagnostics

model <- lm(mpg ~ disp + hp + wt + qsec, data = mtcars)
ols_coll_diag(model)
## Tolerance and Variance Inflation Factor
## ---------------------------------------
##   Variables Tolerance      VIF
## 1      disp 0.1252279 7.985439
## 2        hp 0.1935450 5.166758
## 3        wt 0.1445726 6.916942
## 4      qsec 0.3191708 3.133119
## 
## 
## Eigenvalue and Condition Index
## ------------------------------
##    Eigenvalue Condition Index   intercept        disp          hp           wt
## 1 4.721487187        1.000000 0.000123237 0.001132468 0.001413094 0.0005253393
## 2 0.216562203        4.669260 0.002617424 0.036811051 0.027751289 0.0002096014
## 3 0.050416837        9.677242 0.001656551 0.120881424 0.392366164 0.0377028008
## 4 0.010104757       21.616057 0.025805998 0.777260487 0.059594623 0.7017528428
## 5 0.001429017       57.480524 0.969796790 0.063914571 0.518874831 0.2598094157
##           qsec
## 1 0.0001277169
## 2 0.0046789491
## 3 0.0001952599
## 4 0.0024577686
## 5 0.9925403056

Stepwise Regression

Build regression model from a set of candidate predictor variables by entering and removing predictors based on p values, in a stepwise manner until there is no variable left to enter or remove any more.

Variable Selection

# stepwise regression
model <- lm(y ~ ., data = surgical)
ols_step_both_p(model)
## 
## 
##                                 Stepwise Summary                                
## ------------------------------------------------------------------------------
## Step    Variable             AIC        SBC       SBIC        R2       Adj. R2 
## ------------------------------------------------------------------------------
##  0      Base Model         802.606    806.584    646.794    0.00000    0.00000 
##  1      liver_test (+)     771.875    777.842    616.009    0.45454    0.44405 
##  2      alc_heavy (+)      761.439    769.395    605.506    0.56674    0.54975 
##  3      enzyme_test (+)    750.509    760.454    595.297    0.65900    0.63854 
##  4      pindex (+)         735.715    747.649    582.943    0.75015    0.72975 
##  5      bcs (+)            730.620    744.543    579.638    0.78091    0.75808 
## ------------------------------------------------------------------------------
## 
## Final Model Output 
## ------------------
## 
##                            Model Summary                            
## -------------------------------------------------------------------
## R                         0.884       RMSE                 184.276 
## R-Squared                 0.781       MSE                38202.426 
## Adj. R-Squared            0.758       Coef. Var             27.839 
## Pred R-Squared            0.700       AIC                  730.620 
## MAE                     137.656       SBC                  744.543 
## -------------------------------------------------------------------
##  RMSE: Root Mean Square Error 
##  MSE: Mean Square Error 
##  MAE: Mean Absolute Error 
##  AIC: Akaike Information Criteria 
##  SBC: Schwarz Bayesian Criteria 
## 
##                                  ANOVA                                  
## -----------------------------------------------------------------------
##                    Sum of                                              
##                   Squares        DF    Mean Square      F         Sig. 
## -----------------------------------------------------------------------
## Regression    6535804.090         5    1307160.818    34.217    0.0000 
## Residual      1833716.447        48      38202.426                     
## Total         8369520.537        53                                    
## -----------------------------------------------------------------------
## 
##                                       Parameter Estimates                                        
## ------------------------------------------------------------------------------------------------
##       model         Beta    Std. Error    Std. Beta      t        Sig         lower       upper 
## ------------------------------------------------------------------------------------------------
## (Intercept)    -1178.330       208.682                 -5.647    0.000    -1597.914    -758.746 
##  liver_test       58.064        40.144        0.156     1.446    0.155      -22.652     138.779 
##   alc_heavy      317.848        71.634        0.314     4.437    0.000      173.818     461.878 
## enzyme_test        9.748         1.656        0.521     5.887    0.000        6.419      13.077 
##      pindex        8.924         1.808        0.380     4.935    0.000        5.288      12.559 
##         bcs       59.864        23.060        0.241     2.596    0.012       13.498     106.230 
## ------------------------------------------------------------------------------------------------

Plot

model <- lm(y ~ ., data = surgical)
k <- ols_step_both_p(model)
plot(k)

Stepwise AIC Backward Regression

Build regression model from a set of candidate predictor variables by removing predictors based on Akaike Information Criteria, in a stepwise manner until there is no variable left to remove any more.

Variable Selection

# stepwise aic backward regression
model <- lm(y ~ ., data = surgical)
k <- ols_step_backward_aic(model)
k
## 
## 
##                              Stepwise Summary                              
## -------------------------------------------------------------------------
## Step    Variable        AIC        SBC       SBIC        R2       Adj. R2 
## -------------------------------------------------------------------------
##  0      Full Model    736.390    756.280    586.665    0.78184    0.74305 
##  1      alc_mod       734.407    752.308    583.884    0.78177    0.74856 
##  2      gender        732.494    748.406    581.290    0.78142    0.75351 
##  3      age           730.620    744.543    578.844    0.78091    0.75808 
## -------------------------------------------------------------------------
## 
## Final Model Output 
## ------------------
## 
##                            Model Summary                            
## -------------------------------------------------------------------
## R                         0.884       RMSE                 184.276 
## R-Squared                 0.781       MSE                38202.426 
## Adj. R-Squared            0.758       Coef. Var             27.839 
## Pred R-Squared            0.700       AIC                  730.620 
## MAE                     137.656       SBC                  744.543 
## -------------------------------------------------------------------
##  RMSE: Root Mean Square Error 
##  MSE: Mean Square Error 
##  MAE: Mean Absolute Error 
##  AIC: Akaike Information Criteria 
##  SBC: Schwarz Bayesian Criteria 
## 
##                                  ANOVA                                  
## -----------------------------------------------------------------------
##                    Sum of                                              
##                   Squares        DF    Mean Square      F         Sig. 
## -----------------------------------------------------------------------
## Regression    6535804.090         5    1307160.818    34.217    0.0000 
## Residual      1833716.447        48      38202.426                     
## Total         8369520.537        53                                    
## -----------------------------------------------------------------------
## 
##                                       Parameter Estimates                                        
## ------------------------------------------------------------------------------------------------
##       model         Beta    Std. Error    Std. Beta      t        Sig         lower       upper 
## ------------------------------------------------------------------------------------------------
## (Intercept)    -1178.330       208.682                 -5.647    0.000    -1597.914    -758.746 
##         bcs       59.864        23.060        0.241     2.596    0.012       13.498     106.230 
##      pindex        8.924         1.808        0.380     4.935    0.000        5.288      12.559 
## enzyme_test        9.748         1.656        0.521     5.887    0.000        6.419      13.077 
##  liver_test       58.064        40.144        0.156     1.446    0.155      -22.652     138.779 
##   alc_heavy      317.848        71.634        0.314     4.437    0.000      173.818     461.878 
## ------------------------------------------------------------------------------------------------

Plot

model <- lm(y ~ ., data = surgical)
k <- ols_step_backward_aic(model)
plot(k)