L8

1.2 Import the “Professorial Salaries” and name this dataset “salary”

salary=read.csv("C:/Users/24544355/OneDrive - UTS/Desktop/Assignment/32931/Module10/Professorial Salaries.csv")

1.3 Describe characteristics of the study sample

library(table1)

## 
## Attaching package: 'table1'

## The following objects are masked from 'package:base':
## 
##     units, units<-

table1(~ Sex + Rank + Discipline + Yrs.since.phd + Yrs.service + NPubs + Ncits + Salary, data = salary)

	Overall (N=397)
Sex
Female	39 (9.8%)
Male	358 (90.2%)
Rank
AssocProf	64 (16.1%)
AsstProf	67 (16.9%)
Prof	266 (67.0%)
Discipline
A	181 (45.6%)
B	216 (54.4%)
Yrs.since.phd
Mean (SD)	22.3 (12.9)
Median [Min, Max]	21.0 [1.00, 56.0]
Yrs.service
Mean (SD)	17.6 (13.0)
Median [Min, Max]	16.0 [0, 60.0]
NPubs
Mean (SD)	18.2 (14.0)
Median [Min, Max]	13.0 [1.00, 69.0]
Ncits
Mean (SD)	40.2 (16.9)
Median [Min, Max]	35.0 [1.00, 90.0]
Salary
Mean (SD)	114000 (30300)
Median [Min, Max]	107000 [57800, 232000]

1.4 Check the distribution of professors’ salaries

library(ggplot2)
library(grid)
library(gridExtra)

p = ggplot(data = salary, aes(x = Salary))
p1 = p + geom_histogram(aes(y = ..density..), color = "white", fill = "blue")
p2 = p1 + geom_density(col="red")
p2 + ggtitle("Distribution of professors' salaries") + theme_bw()

## Warning: The dot-dot notation (`..density..`) was deprecated in ggplot2 3.4.0.
## ℹ Please use `after_stat(density)` instead.
## This warning is displayed once every 8 hours.
## Call `lifecycle::last_lifecycle_warnings()` to see where this warning was
## generated.

## `stat_bin()` using `bins = 30`. Pick better value with `binwidth`.

# 1.5 Describe potential confounding factors

library(GGally)

## Registered S3 method overwritten by 'GGally':
##   method from   
##   +.gg   ggplot2

vars = salary[, c("Yrs.since.phd", "Yrs.service", "NPubs", "Ncits", "Sex", "Salary")]
ggpairs(data = vars, mapping = aes(color = Sex))

## `stat_bin()` using `bins = 30`. Pick better value with `binwidth`.

## `stat_bin()` using `bins = 30`. Pick better value with `binwidth`.
## `stat_bin()` using `bins = 30`. Pick better value with `binwidth`.
## `stat_bin()` using `bins = 30`. Pick better value with `binwidth`.
## `stat_bin()` using `bins = 30`. Pick better value with `binwidth`.

1.6 Fit a model to determine whether professors’ sexes were INDEPENDENTLY associated with their salaries

m1 = lm(Salary ~ Sex + Rank + Discipline + Yrs.since.phd + NPubs , data = salary)
summary(m1)

## 
## Call:
## lm(formula = Salary ~ Sex + Rank + Discipline + Yrs.since.phd + 
##     NPubs, data = salary)
## 
## Residuals:
##    Min     1Q Median     3Q    Max 
## -68282 -13908  -1341  10216  97403 
## 
## Coefficients:
##                Estimate Std. Error t value Pr(>|t|)    
## (Intercept)    80408.77    5204.02  15.451  < 2e-16 ***
## SexMale         4428.23    3886.18   1.139  0.25520    
## RankAsstProf  -13026.45    4177.81  -3.118  0.00196 ** 
## RankProf       32928.83    3548.38   9.280  < 2e-16 ***
## DisciplineB    13902.33    2351.28   5.913 7.36e-09 ***
## Yrs.since.phd     60.53     127.16   0.476  0.63433    
## NPubs             28.93      82.05   0.353  0.72464    
## ---
## Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
## 
## Residual standard error: 22690 on 390 degrees of freedom
## Multiple R-squared:  0.4474, Adjusted R-squared:  0.4389 
## F-statistic: 52.62 on 6 and 390 DF,  p-value: < 2.2e-16

1.7 Check the model assumptions

par(mfrow = c(2,2))
plot(m1)

# 1.8 Multicollinearity issue if all potential confounders are included in the model (with no preliminary check) ## 1.8.1 Correlated covariates

p1 = ggplot(data = salary, aes(x = Yrs.service, y = Salary, fill = Sex, col = Sex)) + geom_point() + geom_smooth() + labs(x = "Time in service (years)", y = "Professors' salaries (USD)") + ggtitle("Time in service") + theme_bw() +  theme(legend.position = "none")

p2 = ggplot(data = salary, aes(x = Yrs.since.phd, y = Salary, fill = Sex, col = Sex)) + geom_point() + geom_smooth() + labs(x = "Time since PhD (years)", y = "Professors' salaries (USD)") + ggtitle("Time since PhD") + theme_bw() +  theme(legend.position = "none")

p3 = ggplot(data = salary, aes(x = Yrs.since.phd, y = Salary, fill = Sex, col = Sex)) + geom_point() + geom_smooth(method = "lm") + labs(x = "Time since PhD (years)", y = "Time in service (years)") + ggtitle("Time since PhD and in service") + theme_bw() +  theme(legend.position = "none")

grid.arrange(p1, p2, p3, nrow = 1, top = textGrob("Professors' salaries and correlated variables", gp = gpar(fontsize = 20, font = 1)))

## `geom_smooth()` using method = 'loess' and formula = 'y ~ x'
## `geom_smooth()` using method = 'loess' and formula = 'y ~ x'
## `geom_smooth()` using formula = 'y ~ x'

1.8.2 Model with multicollinearity

m3 = lm(Salary ~ Sex + Rank + Discipline + Yrs.service + Yrs.since.phd + NPubs , data = salary)
summary(m3)

## 
## Call:
## lm(formula = Salary ~ Sex + Rank + Discipline + Yrs.service + 
##     Yrs.since.phd + NPubs, data = salary)
## 
## Residuals:
##    Min     1Q Median     3Q    Max 
## -66068 -13512  -1502  10709  99966 
## 
## Coefficients:
##                Estimate Std. Error t value Pr(>|t|)    
## (Intercept)    78291.51    5256.22  14.895  < 2e-16 ***
## SexMale         4861.17    3869.40   1.256  0.20976    
## RankAsstProf  -12830.98    4155.73  -3.088  0.00216 ** 
## RankProf       32159.07    3544.64   9.073  < 2e-16 ***
## DisciplineB    14382.81    2347.63   6.127  2.2e-09 ***
## Yrs.service     -489.36     212.18  -2.306  0.02161 *  
## Yrs.since.phd    534.44     241.27   2.215  0.02733 *  
## NPubs             28.54      81.60   0.350  0.72672    
## ---
## Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
## 
## Residual standard error: 22560 on 389 degrees of freedom
## Multiple R-squared:  0.4548, Adjusted R-squared:  0.445 
## F-statistic: 46.37 on 7 and 389 DF,  p-value: < 2.2e-16

library(car)

## Loading required package: carData

vif(m3)

##                   GVIF Df GVIF^(1/(2*Df))
## Sex           1.034212  1        1.016962
## Rank          2.019820  2        1.192143
## Discipline    1.066022  1        1.032483
## Yrs.service   5.923063  1        2.433734
## Yrs.since.phd 7.519345  1        2.742142
## NPubs         1.010137  1        1.005056

1.8.3 Model without multicollinearity

m4= lm(Salary ~ Sex + Rank + Discipline + Yrs.since.phd + NPubs , data = salary)
summary(m4)

## 
## Call:
## lm(formula = Salary ~ Sex + Rank + Discipline + Yrs.since.phd + 
##     NPubs, data = salary)
## 
## Residuals:
##    Min     1Q Median     3Q    Max 
## -68282 -13908  -1341  10216  97403 
## 
## Coefficients:
##                Estimate Std. Error t value Pr(>|t|)    
## (Intercept)    80408.77    5204.02  15.451  < 2e-16 ***
## SexMale         4428.23    3886.18   1.139  0.25520    
## RankAsstProf  -13026.45    4177.81  -3.118  0.00196 ** 
## RankProf       32928.83    3548.38   9.280  < 2e-16 ***
## DisciplineB    13902.33    2351.28   5.913 7.36e-09 ***
## Yrs.since.phd     60.53     127.16   0.476  0.63433    
## NPubs             28.93      82.05   0.353  0.72464    
## ---
## Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
## 
## Residual standard error: 22690 on 390 degrees of freedom
## Multiple R-squared:  0.4474, Adjusted R-squared:  0.4389 
## F-statistic: 52.62 on 6 and 390 DF,  p-value: < 2.2e-16

vif(m4)

##                   GVIF Df GVIF^(1/(2*Df))
## Sex           1.031778  1        1.015765
## Rank          1.993803  2        1.188285
## Discipline    1.057628  1        1.028410
## Yrs.since.phd 2.065755  1        1.437274
## NPubs         1.010133  1        1.005054

2.6 Develop a prediction model

xvars = salary[, c("Rank", "Discipline", "Yrs.since.phd", "Yrs.service", "Sex", "NPubs", "Ncits")]
yvar = salary[,c("Salary")]
library(BMA)

## Loading required package: survival

## Loading required package: leaps

## Loading required package: robustbase

## 
## Attaching package: 'robustbase'

## The following object is masked from 'package:survival':
## 
##     heart

## Loading required package: inline

## Loading required package: rrcov

## Scalable Robust Estimators with High Breakdown Point (version 1.7-5)

bma = bicreg(x = xvars, y = yvar, strict = FALSE, OR = 20)
summary(bma)

## 
## Call:
## bicreg(x = xvars, y = yvar, strict = FALSE, OR = 20)
## 
## 
##   6  models were selected
##  Best  5  models (cumulative posterior probability =  0.9676 ): 
## 
##                p!=0    EV         SD       model 1     model 2     model 3   
## Intercept      100.0   8.428e+04  4246.08   85705.87    80159.33    81946.95 
## RankAsstProf   100.0  -1.360e+04  3992.00  -13761.54   -13011.52   -13723.42 
## RankProf       100.0   3.409e+04  3193.57   34082.30    34252.88    33679.90 
## DisciplineB    100.0   1.376e+04  2298.00   13760.96    13779.31    13708.69 
## Yrs.since.phd    3.7   2.628e+00    27.72      .           .           .     
## Yrs.service      3.9  -3.007e+00    26.61      .           .           .     
## SexMale          6.1   2.760e+02  1441.87      .           .         4491.80 
## NPubs            3.2   7.712e-01    15.32      .           .           .     
## Ncits           21.3   2.801e+01    62.18      .          131.65       .     
##                                                                              
## nVar                                              3           4           4  
## r2                                              0.445       0.450       0.447
## BIC                                          -215.78     -213.65     -211.17 
## post prob                                       0.618       0.213       0.061
##                model 4     model 5   
## Intercept       86736.76    84435.56 
## RankAsstProf   -14483.23   -13030.16 
## RankProf        34894.27    33181.41 
## DisciplineB     13561.43    14028.68 
## Yrs.since.phd      .           71.92 
## Yrs.service       -76.33       .     
## SexMale            .           .     
## NPubs              .           .     
## Ncits              .           .     
##                                      
## nVar                  4           4  
## r2                  0.446       0.445
## BIC              -210.28     -210.13 
## post prob           0.039       0.037

par(mfrow = c(1,1))
imageplot.bma(bma)

2.6.1 Fit the model

m5 = lm(Salary ~ Rank + Discipline, data = salary)
summary(m5)

## 
## Call:
## lm(formula = Salary ~ Rank + Discipline, data = salary)
## 
## Residuals:
##    Min     1Q Median     3Q    Max 
## -65990 -14049  -1288  10760  97996 
## 
## Coefficients:
##              Estimate Std. Error t value Pr(>|t|)    
## (Intercept)     85706       3142  27.273  < 2e-16 ***
## RankAsstProf   -13762       3961  -3.475 0.000569 ***
## RankProf        34082       3160  10.786  < 2e-16 ***
## DisciplineB     13761       2296   5.993 4.65e-09 ***
## ---
## Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
## 
## Residual standard error: 22650 on 393 degrees of freedom
## Multiple R-squared:  0.445,  Adjusted R-squared:  0.4407 
## F-statistic:   105 on 3 and 393 DF,  p-value: < 2.2e-16

2.6.2 Check assumptions

par(mfrow = c(2,2))
plot(m5)

vif(m5)

##                GVIF Df GVIF^(1/(2*Df))
## Rank       1.011848  2        1.002949
## Discipline 1.011848  1        1.005907

Optional: Develop a model using stepwise approach

m.sw = lm(Salary ~ Rank + Discipline + Yrs.since.phd + Yrs.service + Sex + NPubs + Ncits, data = salary)
step1 = step(m.sw)

## Start:  AIC=7965.36
## Salary ~ Rank + Discipline + Yrs.since.phd + Yrs.service + Sex + 
##     NPubs + Ncits
## 
##                 Df  Sum of Sq        RSS    AIC
## - NPubs          1 4.5771e+07 1.9626e+11 7963.5
## - Sex            1 7.9652e+08 1.9701e+11 7965.0
## <none>                        1.9622e+11 7965.4
## - Ncits          1 1.8373e+09 1.9805e+11 7967.1
## - Yrs.since.phd  1 2.3730e+09 1.9859e+11 7968.1
## - Yrs.service    1 2.5825e+09 1.9880e+11 7968.6
## - Discipline     1 1.9267e+10 2.1548e+11 8000.5
## - Rank           2 6.8891e+10 2.6511e+11 8080.8
## 
## Step:  AIC=7963.46
## Salary ~ Rank + Discipline + Yrs.since.phd + Yrs.service + Sex + 
##     Ncits
## 
##                 Df  Sum of Sq        RSS    AIC
## - Sex            1 8.2020e+08 1.9708e+11 7963.1
## <none>                        1.9626e+11 7963.5
## - Ncits          1 1.8538e+09 1.9812e+11 7965.2
## - Yrs.since.phd  1 2.3748e+09 1.9864e+11 7966.2
## - Yrs.service    1 2.5877e+09 1.9885e+11 7966.7
## - Discipline     1 1.9221e+10 2.1548e+11 7998.5
## - Rank           2 6.8845e+10 2.6511e+11 8078.8
## 
## Step:  AIC=7963.11
## Salary ~ Rank + Discipline + Yrs.since.phd + Yrs.service + Ncits
## 
##                 Df  Sum of Sq        RSS    AIC
## <none>                        1.9708e+11 7963.1
## - Ncits          1 1.8143e+09 1.9890e+11 7964.8
## - Yrs.since.phd  1 2.3721e+09 1.9945e+11 7965.9
## - Yrs.service    1 2.4548e+09 1.9954e+11 7966.0
## - Discipline     1 1.9479e+10 2.1656e+11 7998.5
## - Rank           2 7.0053e+10 2.6714e+11 8079.9

summary(step1)

## 
## Call:
## lm(formula = Salary ~ Rank + Discipline + Yrs.since.phd + Yrs.service + 
##     Ncits, data = salary)
## 
## Residuals:
##    Min     1Q Median     3Q    Max 
## -67185 -13280  -1513   9905 101141 
## 
## Coefficients:
##                Estimate Std. Error t value Pr(>|t|)    
## (Intercept)    77435.68    4791.69  16.160  < 2e-16 ***
## RankAsstProf  -12140.21    4150.07  -2.925  0.00364 ** 
## RankProf       32672.39    3525.11   9.268  < 2e-16 ***
## DisciplineB    14501.42    2335.70   6.209 1.37e-09 ***
## Yrs.since.phd    521.01     240.47   2.167  0.03087 *  
## Yrs.service     -465.52     211.22  -2.204  0.02811 *  
## Ncits            127.09      67.07   1.895  0.05886 .  
## ---
## Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
## 
## Residual standard error: 22480 on 390 degrees of freedom
## Multiple R-squared:  0.4575, Adjusted R-squared:  0.4492 
## F-statistic: 54.82 on 6 and 390 DF,  p-value: < 2.2e-16