This chapter introduced multiple regression, a way of constructing descriptive models for how the mean of a measurement is associated with more than one predictor variable. The defining question of multiple regression is: What is the value of knowing each predictor, once we already know the other predictors? The answer to this question does not by itself provide any causal information. Causal inference requires additional assumptions. Simple directed acyclic graph (DAG) models of causation are one way to represent those assumptions.
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5-1. Which of the linear models below are multiple linear regressions? \[\begin{align} {μ_i = α + βx_i} \tag{1}\\ μ_i = β_xx_i + β_zz_i \tag{2} \\ μ_i = α + β(x_i − z_i) \tag{3} \\ μ_i = α + β_xx_i + β_zz_i \tag{4} \\ \end{align}\]
# Linear model 2 , 3 , and 4 are multiple linear regressions and model 1 has only on independent variable5-2. Write down a multiple regression to evaluate the claim: Neither amount of funding nor size of laboratory is by itself a good predictor of time to PhD degree; but together these variables are both positively associated with time to degree. Write down the model definition and indicate which side of zero each slope parameter should be on.
# μ_i = α + β1*Xi + β2*Yi
# X is the amount of funding and Y is the size of laboratory
# Both β1 and β2 should be positive5-3. It is sometimes observed that the best predictor of fire risk is the presence of firefighters— States and localities with many firefighters also have more fires. Presumably firefighters do not cause fires. Nevertheless, this is not a spurious correlation. Instead fires cause firefighters. Consider the same reversal of causal inference in the context of the divorce and marriage data. How might a high divorce rate cause a higher marriage rate? Can you think of a way to evaluate this relationship, using multiple regression?
# We may observe a place with high marriage rate associated with high divorce rate. That might be caused by that people who divorced earlier and then get remarried later, increasing the marriage rate. To evaluate the relationship, we can regress the marriage rate on divorce rate and remarriage rate. In that case, if divorce rate is no longer predictive of the marriage rate when remarriage rate is introduced, our hypothesis of the mechanism would be supported.5-4. Suppose you have a single categorical predictor with 4 levels (unique values), labeled A, B, C and D. Let Ai be an indicator variable that is 1 where case i is in category A. Also suppose Bi, Ci, and Di for the other categories. Now which of the following linear models are inferentially equivalent ways to include the categorical variable in a regression? Models are inferentially equivalent when it’s possible to compute one posterior distribution from the posterior distribution of another model. \[\begin{align} μ_i = α + β_AA_i + β_BB_i + β_DD_i \tag{1}\\ μ_i = α + β_AA_i + β_BB_i + β_CC_i + β_DD_i \tag{2}\\ μ_i = α + β_BB_i + β_CC_i + β_DD_i \tag{3}\\ μ_i = α_AA_i + α_BB_i + α_CC_i + α_DD_i \tag{4}\\ μ_i = α_A(1 − B_i − C_i − D_i) + α_BB_i + α_CC_i + α_DD_i \tag{5}\\ \end{align}\]
# 1,3,4,5 are inferentially equivalent as they each allow the computation of each other’s posterior distribution
# 2 includes all categories A, B, C, D and an intercept α, not the correct way to build model with categorical data.
# 1 includes a single intercept for category C and slopes for the rest.
# 3 includes a single intercept for category A and slopes for the rest.
# 4 applies unique index approach and includes unique intercept for each category.
# 5 applies the reparameterized approach to multiply the intercept for category A times 1 when in category A and times 0 otherwise.5-5. One way to reason through multiple causation hypotheses is to imagine detailed mechanisms through which predictor variables may influence outcomes. For example, it is sometimes argued that the price of gasoline (predictor variable) is positively associated with lower obesity rates (outcome variable). However, there are at least two important mechanisms by which the price of gas could reduce obesity. First, it could lead to less driving and therefore more exercise. Second, it could lead to less driving, which leads to less eating out, which leads to less consumption of huge restaurant meals. Can you outline one or more multiple regressions that address these two mechanisms? Assume you can have any predictor data you need.
# μi= α + β1*Xi+ β2*Yi+ β3*Zi
# X is the the price of gasoline, Y is the time of exercise per year, and Z is the number of eating out per year.
# Y is used to address the first mechanism related to time spent on exercise. Z is used to address the second mechanism, related to the frequency of eating out at restaurant.