Oct 30, 2012 · In my Introductory Econometrics class we discussed a concept of "plim" or "probability limit. I'm not sure what this means though and my professor doesn't explain it well at all. Can …

May 17, 2021 · Why does plim converge to expected value? Ask Question Asked 4 years, 7 months ago Modified 4 years, 7 months ago

The comment by zhoraster helped me figure it out. Since we know each Random Variable converges in probability to something, and convergence is probability for a random vector is defined as element …

Apr 28, 2023 · The multivariate version of cauchy-schwarz that I know is \begin {equation} \mathrm {Var} (B_n) \ge \mathrm {Cov} (B_n,A_n) \mathrm {Var} (A_n)^ {-1} \mathrm {Cov} (A ...

Mar 29, 2020 · So I applied the CLT incorrectly? Because $\hat {\beta}$ is not a sample mean?

Mar 30, 2019 · where we have used homoskedasticity, plim properties and Central Limit Theorem (explaining the $\frac {1} {n}$)

Apr 27, 2021 · It is preserved under uniformly continuous $f$. This is an easy consequence of the definition of uniform continuity.

Feb 14, 2022 · I am currently reading Introductory Econometrics by Wooldridge. Specifically, Chapter 9, in which he shows the attenuation bias that occurs due to the classical errors-in-variables …

Jan 30, 2020 · I find your question confusing, berhaps you could clarify: Since you want to minimize $||Y-\theta X+\Delta||_2$ you can always select $\Delta=Y-\theta X$ for arbitrary $\theta 's$

Hope I can revive this old question. I just started on the subject of martingale convergence and convergence of random variables plays a big part in that. I was wondering about your statement "For …