Deck 18: The Theory of Multiple Regression

Write the following three linear equations in matrix format Ax = b,where x is a 3×1 vector containing q,p,and y,A is a 3×3 matrix of coefficients,and b is a 3×1 vector of constants.
q = 5 +3 p - 2 y
q = 10 - p + 10 y
p = 6 y

Write an essay on the difference between the OLS estimator and the GLS estimator.

In Chapter 10 of your textbook,panel data estimation was introduced.Panel data consist of observations on the same n entities at two or more time periods T.For two variables,you have
(Xit,Yit),i = 1,... ,n and t = 1,... ,T
where n could be the U.S.states.The example in Chapter 10 used annual data from 1982 to 1988 for the fatality rate and beer taxes.Estimation by OLS,in essence,involved "stacking" the data.
(a)What would the variance-covariance matrix of the errors look like in this case if you allowed for homoskedasticity-only standard errors? What is its order? Use an example of a linear regression with one regressor of 4 U.S.states and 3 time periods.
(b)Does it make sense that errors in New Hampshire,say,are uncorrelated with errors in Massachusetts during the same time period ("contemporaneously")? Give examples why this correlation might not be zero.
(c)If this correlation was known,could you find an estimator which was more efficient than OLS?

Assume that the data looks as follows:
Y = ,U = ,X = ,and β = (β1)
Using the formula for the OLS estimator = ( X)-1 Y,derive the formula for 1,the only slope in this "regression through the origin."

A = ,B = ,and C = show that = + and = .

Your textbook derives the OLS estimator as = X)-1 Y.
Show that the estimator does not exist if there are fewer observations than the number of explanatory variables,including the constant.What is the rank of X in this case?

Let Y = and X = Find X, Y, ( X)-1 and finally ( X)-1 Y.

Define the GLS estimator and discuss its properties when Ω is known.Why is this estimator sometimes called infeasible GLS? What happens when Ω is unknown? What would the Ω matrix look like for the case of independent sampling with heteroskedastic errors,where var(ui Xi)= ch(Xi)= σ2 ? Since the inverse of the error variance-covariance matrix is needed to compute the GLS estimator,find Ω-1.The textbook shows that the original model Y = Xβ + U will be transformed into = FU,and F = Ω-1.Find F in the above case,and describe what effect the transformation has on the original data.

Give several economic examples of how to test various joint linear hypotheses using matrix notation.Include specifications of Rβ = r where you test for (i)all coefficients other than the constant being zero, (ii)a subset of coefficients being zero,and (iii)equality of coefficients.Talk about the possible distributions involved in finding critical values for your hypotheses.

Consider the multiple regression model from Chapter 5,where k = 2 and the assumptions of the multiple regression model hold.
(a)Show what the X matrix and the β vector would look like in this case.
(b)Having collected data for 104 countries of the world from the Penn World Tables,you want to estimate the effect of the population growth rate (X1i)and the saving rate (X2i)(average investment share of GDP from 1980 to 1990)on GDP per worker (relative to the U.S. )in 1990.What are your expected signs for the regression coefficient? What is the order of the (X'X)here?
(c)You are asked to find the OLS estimator for the intercept and slope in this model using the
formula = (X'X)-1 X'Y.Since you are more comfortable in inverting a 2×2 matrix (the inverse of a 2×2 matrix is, = )
you decide to write the multiple regression model in deviations from mean form.Show what the X matrix,the (X'X)matrix,and the X'Y matrix would look like now.
(Hint: use small letters to indicate deviations from mean,i.e. ,zi = Zi - and note that
Yi = 0 + 1X1i + 2X2i + i = 0 + 1 1 + 2 2.
Subtracting the second equation from the first,you get
yi = 1x1i + 2x2i + i)
(d)Show that the slope for the population growth rate is given by 1 = (e)The various sums needed to calculate the OLS estimates are given below: = 8.3103; = .0122; = 0.6422 = -0.2304; = 1.5676; = -0.0520
Find the numerical values for the effect of population growth and the saving rate on per capita income and interpret these.
(f)Indicate how you would find the intercept in the above case.Is this coefficient of interest in the interpretation of the determinants of per capita income? If not,then why estimate it?

Prove that under the extended least squares assumptions the OLS estimator is unbiased and that its variance-covariance matrix is (X'X)-1.

In order for a matrix A to have an inverse,its determinant cannot be zero.Derive the determinant of the following matrices:
A = B = X'X where X = (1 10)

Your textbook shows that the following matrix (Mx = In - Px)is a symmetric idempotent matrix.Consider a different Matrix A,which is defined as follows: A = I - ιι' and ι = a.Show what the elements of A look like.
b.Show that A is a symmetric idempotent matrix
c.Show that Aι = 0.
d.Show that A = ,where is the vector of OLS residuals from a multiple regression.

Consider the following population regression function: Y = Xβ + U
where Y= ,X= ,β = ,U= Given the following information on population growth rates (Y)and education (X)for 86 countries , , , , a)find X'X,X'Y, (X'X)-1 and finally (X'X)-1 X'Y.
b)Interpret the slope,and if necessary,the intercept.

For the OLS estimator = ( X)-1 Y to exist,X'X must be invertible.This is the case when X has full rank.What is the rank of a matrix? What is the rank of the product of two matrices? Is it possible that X could have rank n? What would be the rank of X'X in the case n<(k+1)? Explain intuitively why the OLS estimator does not exist in that situation.

Using the model Y = Xβ + U,and the extended least squares assumptions,derive the OLS estimator .Discuss the conditions under which X is invertible.

You have obtained data on test scores and student-teacher ratios in region A and region B of your state.Region B,on average,has lower student-teacher ratios than region A.You decide to run the following regression.
Yi = β0+ β1X1i + β2X2i + β3X3i+ui
where X1 is the class size in region A,X2 is the difference between the class size between region A and B,and X3 is the class size in region B.Your regression package shows a message indicating that it cannot estimate the above equation.What is the problem here and how can it be fixed? Explain the problem in terms of the rank of the X matrix.

Write the following four restrictions in the form Rβ = r,where the hypotheses are to be tested simultaneously.
β3 = 2β5,
β1 + β2 = 1,
β4 = 0,
β2 = -β6.
Can you write the following restriction β2 = - in the same format? Why not?

Consider the following symmetric and idempotent Matrix A: A = I - ιι' and ι = a.Show that by postmultiplying this matrix by the vector Y (the LHS variable of the OLS regression),you convert all observations of Y in deviations from the mean.
b.Derive the expression Y'AY.What is the order of this expression? Under what other name have you encountered this expression before?

Write down,in general,the variance-covariance matrix for the multiple regression error term U.Using the assumptions cov(ui,uj|XiXj)= 0 and var(ui|Xi)= .Show that the variance-covariance matrix can be written as In.