Charles University FSV UK STAKAN III Institute of Economic Studies Faculty of Social Sciences...

Charles University

FSV UK

STAKAN III

Institute of Economic Studies

Faculty of Social Sciences Institute of Economic Studies

Faculty of Social Sciences

Jan Ámos VíšekJan Ámos Víšek

Econometrics Econometrics

Tuesday, 14.00 – 15.20

Charles University

Second Lecture

Schedule of today talk

A brief repetition of the “results” of the first lecture.

The Ordinary Least Squares

What it is, does it exist at all, formula and properties ( in the form of a theorem).

An alternative method

Galton, F. (1886): Regression towards mediocrity in hereditary stature. (Návrat k průměru ve zděděné postavě.)

Journal of the Anthropological Institute vol.~15, pp. 246-263.

0XY

How to estimate from data?0

REGRESSION MODEL

At the end of previous lecture we arrived at:

Response

variable

Explanatory variable

Tiii

p XY)(rR

1

tan2

iX

iY )(r)(Sn

1i

2i

Find minimum of over all !!)(S pR

-th residual i

The method is called : The ( ordinary ) least squares

Adrien Marie Legendre (1805) Carl Friedriech Gauss (1809)

n,,2,1i,XYp

1ji

0jiji

2n

1ij

p

1jijiR

)n,OLS( XYminargˆp

2n

1i

TiiR

XYminarg p

The Ordinary Least Squares Odhad metodou nejmenší čtverců

)n,OLS(̂

2n

1i

TiiR

XYminarg p

The Ordinary Least Squares Odhad metodou nejmenší čtverců

Does it exist at all?

)XXXX(Y)(r pp131321211111

)XXXX(Y)(r pp232322212122

)XXXX(Y)(r pnp33n22n11nnn

22n

1i

Tii )(rXY)(S

)(ri

)n,OLS(̂ pRminarg

22n

1i

Tii )(rXY)(S

nj

j2

j1

X

X

X

)j(X

p

1jj

)j(XY)(r

2p

1jj

)j(XY

2p

1jj

)j(XY

Estimate by OLS (odhad MNČ)

-th explanatory variable ( -tá vysvětlující veličina)

jj

)n,OLS(̂ pRminarg

The Ordinary Least Squares Odhad metodou nejmenší čtverců

2p

1jj

)j(XY

}XZ:RZ{)X(

p

1jj

)j(n

M

Linear envelope of ( lineární obal )

XX

)X(Zminarg M2

ZY

)X(Zminarg M ZY

)n,OLS(ˆX

)X(Rn M

.Z

ZY Y

)2(X

)1(X

)X( M

.

)n,SLO(ˆX

The first explanatory variable

)ˆ(r )n,SLO(

Y

)X(Rn M

.

The second explanatory variable

..

)n,OLS(ˆX

The first explanatory variable

)ˆ(r )n,SLO(

)X(Rn M

.

The second explanatory variable

X

)(r Y

The solution exists and is unique.

2n

1i

Tii XY)(S

The functional to be minimized

2n

1i

Tii

jj

XY)(S

Ti

j

n

1i

Tii XXY2

ij

p

1kkik

j

Ti

j

XXX

p,,2,1j,0XXY)(S2

1ij

n

1i

Tii

j

p,,2,1j,0XXY ij

n

1i

Tii

Normal equations

n

1i

Tiiii

n

1i

Tii XYX0XXY

p1

12

11

X

X

X

)XY( T

11

p2

22

21

X

X

X

)XY( T

22

np

2n

1n

X

X

X

)XY( T

nn

0

0

0

Normal equations

npp2p1

2n2212

1n2111

XXX

XXX

XXX

Tnn

T22

T11

XY

XY

XY

0

0

0

p1

12

11

X

X

X

)XY( T

11

p2

22

21

X

X

X

)XY( T

22

np

2n

1n

X

X

X

)XY( T

nn

0

0

0

npp2p1

2n2212

1n2111

XXX

XXX

XXX

Tnn

T22

T11

XY

XY

XY

0

0

0

npp2p1

2n2212

1n2111

XXX

XXX

XXX

n

2

1

Y

Y

Y

0

0

0

Tn

T2

T1

X

X

X

Normal equations

npp2p1

2n2212

1n2111

XXX

XXX

XXX

n

2

1

Y

Y

Y

0

0

0

Tn

T2

T1

X

X

X

Tn

T2

T1

X

X

X

np2n1n

p22221

p11211

XXX

XXX

XXX

np2n1n

p22221

p11211

XXX

XXX

XXX

p

2

1

X

0XXYXXYX TTT

Normal equations

Normal equations

is of full rank, i.e. is regular X XX T

YXXXˆ T1T)n,OLS(

Ordinary Least Squares (odhad metodou nejmenších čtverců)

(Please, keep this formula in mind, we shall use it many, many times.)

0XXYXXYX TTT

XXYX TT YXXX TT

YXXXˆ T1T)n,OLS(

Ordinary Least Squares (odhad metodou nejmenších čtverců)

0XYHaving recalled the model and substituting it here ,

we arrive at )X(XXXˆ 0T1T)n,OLS(

T1T0T1T XXXXXXX

T1T0 XXX

Ordinary Least Squares (odhad metodou nejmenších čtverců)

T1T0)n,OLS( XXXˆ

T1T0)n,OLS( XXXˆ

Definition

An estimator where LY)X,Y(~ )X(LL

is matrix, is called the linear estimator .)np(

)n,L( 1̂

n

1i

TiiR

XYminarg p

- estimate Odhad metodou nejmenší absolutních odchylek

)(ri 1L

Roger Joseph Boscovich (1757)

Pierre Simon Laplace (1793)

Galileo Galilei (1632)

)n,L( 1̂

n

1i

TiiR

XYminarg p

- estimator Odhad metodou nejmenší absolutních odchylek

Does it exist at all?

)(ri 1L

Let be a sequence of r.v’s,

. Then is the best linear unbiased estimator .

If moreover , and ‘s are independent, is consistent. If further

where is a regular matrix, then

where

.

1ii }{ ,,0 ij

2jii

)n,SLO(̂

)n(OXX T )n(O)XX( 11T

)n,SLO(̂

QXXlim Tn

1

n

Q

)0))ˆ( 0),( ,(n

nOLS N(L n

120),( ))ˆ((cov QnOLS n

Theorem

),0(2

ij is Kronecker delta, i.e. if and for .1ij ji 0ij ji

What is to be learnt from this lecture for exam ?

The Ordinary Least Squares (OLS) – principle and existence.

Properties of OLS and conditions necessary for them.

Alternative estimating method.

All what you need is on http://samba.fsv.cuni.cz/~visek/Econometrics_Up_To_2010