Deck 17: The Theory of Linear Regression With One Regressor

The Gauss-Markov Theorem proves that

$E \left( \frac { 1 } { n - 2 } \sum _ { i = 1 } ^ { n } \hat { u } _ { i } ^ { 2 } \right)$

Finite-sample distributions of the OLS estimator and t-statistics are complicated, unless

.

The link between the variance of $\bar { Y }$ and the probability that $\bar { Y }$ is within $\pm \delta \text { of } \mu _ { Y }$ is provided by

You need to adjust $S _ { \hat { u } } ^ { 2 }$ by the degrees of freedom to ensure that $s _ { \hat { u } } ^ { 2 }$ is

An implication of $\sqrt { n } \left( \hat { \beta } _ { 1 } - \beta _ { 1 } \right) \stackrel { d } { \rightarrow } N \left( 0 , \frac { \operatorname { var } \left( v _ { i } \right) } { \left[ \operatorname { var } \left( X _ { i } \right) \right] ^ { 2 } } \right)$ is that

All of the following are good reasons for an applied econometrician to learn some econometric theory, with the exception of

Under the five extended least squares assumptions, the homoskedasticity-only t- distribution in this chapter

The class of linear conditionally unbiased estimators consists of

The following is not part of the extended least squares assumptions for regression with a single regressor:

For this question you may assume that linear combinations of normal variates are
themselves normally distributed.Let a, b, and c be non-zero constants.
(a)

(a)

(a)Which of the Extended Least Squares Assumptions are satisfied here? Prove your
assertions.

(a)State the condition under which this estimator is unbiased.

What does the Gauss-Markov theorem prove? Without giving mathematical details,
explain how the proof proceeds.What is its importance?

One of the earlier textbooks in econometrics, first published in 1971, compared
"estimation of a parameter to shooting at a target with a rifle.The bull's-eye can be taken
to represent the true value of the parameter, the rifle the estimator, and each shot a
particular estimate." Use this analogy to discuss small and large sample properties of
estimators.How do you think the author approached the n → ∞ condition? (Dependent
on your view of the world, feel free to substitute guns with bow and arrow, or missile.)

(a)

(Requires Appendix material)State and prove the Cauchy-Schwarz Inequality.

(Requires Appendix Material)This question requires you to work with Chebychev's
Inequality.
(a)State Chebychev's Inequality.

"One should never bother with WLS.Using OLS with robust standard errors gives
correct inference, at least asymptotically." True, false, or a bit of both? Explain carefully
what the quote means and evaluate it critically.

"I am an applied econometrician and therefore should not have to deal with econometric
theory.There will be others who I leave that to.I am more interested in interpreting the
estimation results." Evaluate.

Discuss the properties of the OLS estimator when the regression errors are
homoskedastic and normally distributed.What can you say about the distribution of the
OLS estimator when these features are absent?

.