2(B。+BX+B2X2,+.+BX)=2Y 2(B。+B,Xu+B2X2+.+BXa)X,=2Y,Xu 2(B。+BX,+B2,X2,+.+BX)X2,=Y,X2 (B。+B,Xu+B2X2,+.+BXa)X右=Y,X B1,j=0,1,2,L,k
+ + + + = + + + + = + + + + = + + + + = i i k ki ki i ki i i i k ki i i i i i k ki i i i i i k ki i X X X X Y X X X X X Y X X X X X Y X X X X Y ) ˆ ˆ ˆ ˆ ( ) ˆ ˆ ˆ ˆ ( ) ˆ ˆ ˆ ˆ ( ) ˆ ˆ ˆ ˆ ( 0 1 1 2 2 0 1 1 2 2 2 2 0 1 1 2 2 1 1 0 1 1 2 2 ˆ , 0,1,2, , j j k = L
正规方程组的矩阵形式 n ∑X 1 1 1 ∑X ∑XXa B, Xu X12 Y ∑X:∑XaX . ∑x品 g X XK2 . X in (XX)B=XY 条件? B=(XXXY
•正规方程组的矩阵形式 = k k kn n n ki ki i ki k i i i ki i ki Y Y Y X X X X X X X X X X X X X X n X X 2 1 1 2 1 1 1 1 2 1 0 2 1 1 2 1 1 1 1 1 1 ˆ ˆ ˆ (XX)β ˆ = XY β= XX XY −1 ( ) ˆ 条件?
·OLS估计的矩阵表示 Q-Zci-c'e-(Y-XB)(Y-XB) (Y-XB)'(Y-XB)=0 (YY-8XY-YXB+BXXB)=0 XY+XXB=0 XY-XXB B=XXXY
• OLS估计的矩阵表示 ( ˆ ) ( ˆ ) 0 ˆ Y − Xβ Y − Xβ = β ( ˆ ˆ ˆ ˆ ) 0 ˆ − − + = Y Y βX Y Y Xβ βX Xβ β − XY + XXβ ˆ = 0 β= XX XY −1 ( ) ˆ XY = XXβ ˆ ) ˆ ) ( ˆ ( 1 = 2 = ee = Y − Xβ Y − Xβ = n i i Q e
2、正规方程组的另一种表达 XY=XXB 将Y=XB+e代入得 X'XB+X'e=XXB X'e=0 ∑g=0 该正规方程 组成立的条 ∑X,e=0j=l,2.k 件是什么?
2、正规方程组的另一种表达 XY = XXβ ˆ X Xβ ˆ X e X Xβ ˆ + = Xe = 0 0 0 1,2, , i i ij i i e X e j k = = = 该正规方程 组成立的条 件是什么?
3、随机误差项的方差σ的无偏估计 e=Y-XB =XB+u-X(X'X)X(XB+) =u-X(XX)X'u =I-X(XX)X)u =Mu e'e u'M'Mu uMu M为等幂矩阵
3、随机误差项的方差的无偏估计 e = Y − Xβ ˆ Mμ I X X X X μ μ X X X X μ Xβ μ X X X X Xβ μ = = − = − = + − + − − − ( ( ) ) ( ) ( ) ( ) 1 1 1 e e = = μ M Mμ μ Mμ M为等幂矩阵