HW 2 Flashcards

1
Q

What is the assumption of the Pooled OLS (POLS) model to estimate the effect of exec consistently? In which way does the Fixed Effects (FE) model relax this assumption?

A
  • POLS assumes a composite error term cit = μi + vi
    • requires that the error term is uncorrelated with all regressors: Cov(cit, execit) = 0
    • this includes Cov(μi, execit) = 0
  • FE is a time-demeaned estimation
    • therefore state specific effect μi drops out (it is constant over time)
    • only requires Cov(vit, execit) = 0
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2
Q

Compare the results of two specifications for the POLS model: one without and one with the south dummy.

Discuss how the effect of exec changes between these specifications. What does this suggest concerning the validity of the assumption behind the POLS model?

(both models show positive effect of exec, w/o the south dummy, there is a larger coefficient for exec and higher significance)

A

we see from excluding south that:

  • the effect of exec is biased upwards
  • suggests that state-specific effects are correlated with exec
  • exogeneity assumption Cov(execitit)=0 is likely not met -> there are probably even other state-specific variables that are not controlled for -> POLS is not consistent
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3
Q

Interpret the results of the FE model:

  • FE: βexec: -0.15
  • POLS: βexec: 0.26***

Give an economic interpretation as to why the effect of exec differs so much compared to the POLS model.

Why does the variable south drop out in the FE model?

A
  1. Interpretation: one additional execution is associated with .15 fewer murders (FE) and .26 more murders (POLS) holding all other constant
  2. Economic reasoning: in POLS, state specific effects such as culture or poverty are not accounted for. If they are included (FE), executions do not have a significant effect any more.
  3. South dummy drops out in FE, because it is state-specific and time-constant
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4
Q

Show formally that for T = 2, the First Differences (FD) estimator is equal to the FE estimator.

A
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5
Q

what are stochastic regressors?

A

The term stochastic regressor means that the regressors, i.e. the explanatory variables are random with the change of time

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6
Q

Consider the one-way error component regression model with random effects below.

Which estimator for β would you use in case of known variance components σμ2 and σv2 ? Explain why.

A

GLSE, because it is feasible and BLUE (more efficient)

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7
Q

Consider the one-way error component regression model with random effects below.

Give the pooled OLS estimator of θ in matrix notation and show that it is unbiased. Does this also hold in the fixed effects model? Explain briefly.

A

1. Find ^θPOLS.

  • POLS = (Z’Z)-1Z’Y = (Z’Z)-1Z’(Zθ+ε) = (Z’Z)-1Z’Z θ + (Z’Z)-1Z’ε
  • POLS = θ + (Z’Z)-1Z’ε

2. Find E [^θPOLS].

  • E[^θPOLS] = E[θ + (Z’Z)-1Z’ε] = θ + (Z’Z)-1Z’E[ε]
  • E[ε] = 0 by assumption
  • E[^θPOLS] = θ

3. Fixed Effects model?

  • in FE, E[ε] = E[Gμ+v] = Gμ
  • POLS is biased unless all individual specific effects μ are zero!
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8
Q

Show that the within-estimator ^βw=(X’QX)-1X’QY is an unbiased estimator of β.

  • Q = INT - P
  • P = G(G’G)-1G’

What are additional assumption(s) required for that property?

A

1. Use F-W to simplify estimator ^βw=(X’QX)-1X’QY:

  • w = (X’QX)-1 X’Q (α1NT+ Xβ + Gμ + v)
    • Due to F-W: Q1NT = 0, QG = 0
  • w = β + (X’QX)-1 X’Q v

2. Show unbiasedness

  • E[^βw] = β + (X’QX)-1 X’Q E[v]
    • By assumption, E[v] = 0
  • E[^βw] = β

3. Additional assumptions:

  • X’QX needs to be invertible
  • rk (x, G) = k + N
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9
Q

Consider the one-way error component regression model with random effects below. Suppose that the explanatory variables are stochastic and at least partly correlated with the individual-specific effects μi such that E[μ|X] ≠ 0, but E[v|X] = 0.

Would you still use βPOLS? Explain briefly your answer.

A

No, because E[μ|X] ≠ 0 menas E[ε|X] ≠ 0 (endogenous regressors)

GLSE is now biased!

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10
Q

Consider the one-way error component regression model with random effects below. Suppose that the explanatory variables are stochastic and at least partly correlated with the individual-specific effects μi such that E[μ|X] ≠ 0, but E[v|X] = 0.

Name a test to check the null hypothesis E[μ|X] = 0.

A

Hausman test

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11
Q

Consider the one-way error component regression model with random effects below. Suppose that the explanatory variables are stochastic and at least partly correlated with the individual-specific effects μi such that E[μ|X] ≠ 0, but E[v|X] = 0.

Verify that the within-estimator ^βw=(X’QX)-1X’QY remains unbiased. In which sense are the assumptions required for the unbiasedness of the within-estimator weaker than those required for the unbiasedness of the GLS estimator?

A
  • E[^βw] = β + E[(X’QX)-1X’Qv]
  • = β + E[E[(X’QX)-1X’Qv] ] -> Law of iterated expectations
  • = β + E[(X’QX)-1X’QE[v|X] ]
  • = β due to E[v|X] = 0

Weaker assumptions because within estimator does not require E[μ|X] = 0

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