Variance decomposition of forecast errors

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Variance decomposition or forecast error variance decomposition indicates the amount of information each variable contributes to the other variables in a vector autoregression (VAR) model.^[1] Variance decomposition determines how much of the forecast error variance of each of the variables can be explained by exogenous shocks to the other variables.

For the VAR (p) of form

${\displaystyle y_{t}=\nu +A_{1}y_{t-1}+\dots +A_{p}y_{t-p}+u_{t}}$ .

Change this to a VAR (1) by writing it in companion form (see general matrix notation of a VAR(p))

${\displaystyle Y_{t}=\mathbf {\nu } +AY_{t-1}+U_{t}}$ where

${\displaystyle A={\begin{bmatrix}A_{1}&A_{2}&\dots &A_{p-1}&A_{p}\\\mathbf {I} _{k}&0&\dots &0&0\\0&\mathbf {I} _{k}&&0&0\\\vdots &&\ddots &\vdots &\vdots \\0&0&\dots &\mathbf {I} _{k}&0\\\end{bmatrix}}}$ , ${\displaystyle Y={\begin{bmatrix}y_{1}\\\vdots \\y_{p}\end{bmatrix}}}$, ${\displaystyle \mathbf {\nu } ={\begin{bmatrix}\nu \\0\\\vdots \\0\end{bmatrix}}}$ and ${\displaystyle U_{t}={\begin{bmatrix}u_{t}\\0\\\vdots \\0\end{bmatrix}}}$

where ${\displaystyle y_{t}}$, ${\displaystyle \nu }$ and ${\displaystyle u}$ are ${\displaystyle k}$ dimensional column vectors, ${\displaystyle A}$ is ${\displaystyle kp}$ by ${\displaystyle kp}$ dimensional matrix and ${\displaystyle Y}$, ${\displaystyle \mathbf {\nu } }$ and ${\displaystyle U}$ are ${\displaystyle kp}$ dimensional column vectors.

Calculate the mean squared error of the h-step forecast of variable j, ${\displaystyle \mathbf {MSE} [y_{j,t}(h)]}$,

${\displaystyle \mathbf {MSE} [y_{j,t}(h)]=\sum _{i=0}^{h-1}\sum _{k=1}^{K}(e_{j}'\Theta _{i}e_{k})^{2}={\bigg (}\sum _{i=0}^{h-1}\Theta _{i}\Theta _{i}'{\bigg )}_{jj}={\bigg (}\sum _{i=0}^{h-1}\Phi _{i}\Sigma _{u}\Phi _{i}'{\bigg )}_{jj},}$

where ${\displaystyle e_{j}}$ is the j^th column of ${\displaystyle I_{K}}$ and the subscript ${\displaystyle jj}$ refers to that element of the matrix. ${\displaystyle \Theta _{i}=\Phi _{i}P}$ where ${\displaystyle P}$ is a lower triangular matrix obtained by a Cholesky decomposition of ${\displaystyle \Sigma _{u}}$ such that ${\displaystyle \Sigma _{u}=PP'}$. ${\displaystyle \Phi _{i}=JA^{i}J'}$ where ${\displaystyle J={\begin{bmatrix}\mathbf {I} _{k}&0&\dots &0\end{bmatrix}}}$ so ${\displaystyle J}$ is ${\displaystyle k}$ by ${\displaystyle kp}$ dimensional matrix. ${\displaystyle \Sigma _{u}}$ is the covariance matrix of the errors ${\displaystyle u_{t}}$.

The amount of forecast error variance of variable ${\displaystyle j}$ accounted for by exogenous shocks to variable ${\displaystyle k}$ is given by ${\displaystyle \omega _{jk,h}.}$

${\displaystyle \omega _{jk,h}=\sum _{i=0}^{h-1}(e_{j}'\Theta _{i}e_{k})^{2}/MSE[y_{j,t}(h)].}$

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