1.9 KiB
1.9 KiB
The Cramer-Rao Lower Bound – Derivation and Examples
Source: HBS Research Computing Services Training Material URL: https://www.hbs.edu/research-computing-services/Shared%20Documents/Training/cramerrao.pdf
Content Summary
This document provides a step-by-step derivation and examples of the Cramer-Rao Lower Bound (CRLB) using the normal and binomial distributions. It covers the following concepts:
- The Score: Derivative of the log-likelihood function, viewed as a random variable.
- Expectation of the Score: Proven to be 0.
- Fisher Information: Expectation of the square of the score (or variance of the score), representing the "information" the data provides about the parameter.
- Cramer-Rao Bound: The minimum possible variance for any unbiased estimator is
1/I, whereIis the Fisher Information. - Alternative Expression for Fisher Information:
I(\theta) = -E[\frac{\partial^2}{\partial \theta^2} \log f(x|\theta)], connecting information to the curvature of the log-likelihood. - Observed vs. Expected Information: Expected information uses the true parameter and expectation over all data; observed information uses the estimated parameter and actual data.
- Information Matrix: Extension to multiple parameters.
- Connection to Maximum Likelihood Estimation (MLE): MLE is asymptotically efficient, meaning its variance reaches the CRLB as sample size grows.
Examples Detailed
- Normal Distribution:
- Score:
g(\mu) = \frac{n}{\sigma^2}(\bar{x} - \mu) - Fisher Information:
I = \frac{n}{\sigma^2} - CRLB:
\frac{\sigma^2}{n}, which matches the variance of the sample mean\bar{x}.
- Score:
- Binomial Distribution:
- Score:
g(\pi) = \frac{k}{\pi} - \frac{n-k}{1-\pi} - Fisher Information:
I = \frac{n}{\pi(1-\pi)} - CRLB:
\frac{\pi(1-\pi)}{n}, matching the variance of the sample proportionk/n.
- Score: