- Published on
Deriving the OLS Estimator
- Authors
- Name
- Robert Borbély
Introduction
Parsing and display of math equations is included in this blog template. Parsing of math is enabled by remark-math
and rehype-katex
. KaTeX and its associated font is included in _document.js
so feel free to use it on any page. 1
Inline math symbols can be included by enclosing the term between the $
symbol.
Math code blocks are denoted by $$
.
If you intend to use the $
sign instead of math, you can escape it (\$
), or specify the HTML entity ($
) 2
Inline or manually enumerated footnotes are also supported. Click on the links above to see them in action.
Deriving the OLS Estimator
Using matrix notation, let denote the number of observations and denote the number of regressors.
The vector of outcome variables is a matrix,
\mathbf{Y} = \left[\begin{array}
{c}
y_1 \\
. \\
. \\
. \\
y_n
\end{array}\right]
The matrix of regressors is a matrix (or each row is a vector),
\mathbf{X} = \left[\begin{array}
{ccccc}
x_{11} & . & . & . & x_{1k} \\
. & . & . & . & . \\
. & . & . & . & . \\
. & . & . & . & . \\
x_{n1} & . & . & . & x_{nn}
\end{array}\right] =
\left[\begin{array}
{c}
\mathbf{x}'_1 \\
. \\
. \\
. \\
\mathbf{x}'_n
\end{array}\right]
The vector of error terms is also a matrix.
At times it might be easier to use vector notation. For consistency, I will use the bold small x to denote a vector and capital letters to denote a matrix. Single observations are denoted by the subscript.
Least Squares
Start:
Assumptions:
- Linearity (given above)
- (conditional independence)
- rank() = (no multi-collinearity i.e. full rank)
- (Homoskedascity)
Aim:
Find that minimises the sum of squared errors:
Solution:
Hints: is a scalar, by symmetry .
Take matrix derivative w.r.t :
\begin{aligned}
\min Q & = \min_{\beta} \mathbf{Y}'\mathbf{Y} - 2\beta'\mathbf{X}'\mathbf{Y} +
\beta'\mathbf{X}'\mathbf{X}\beta \\
& = \min_{\beta} - 2\beta'\mathbf{X}'\mathbf{Y} + \beta'\mathbf{X}'\mathbf{X}\beta \\
\text{[FOC]}~~~0 & = - 2\mathbf{X}'\mathbf{Y} + 2\mathbf{X}'\mathbf{X}\hat{\beta} \\
\hat{\beta} & = (\mathbf{X}'\mathbf{X})^{-1}\mathbf{X}'\mathbf{Y} \\
& = (\sum^{n} \mathbf{x}_i \mathbf{x}'_i)^{-1} \sum^{n} \mathbf{x}_i y_i
\end{aligned}
Footnotes
For the full list of supported TeX functions, check out the KaTeX documentation ↩
$10 and $20. ↩