Skip to main content

Blending Expert Estimates




submit to reddit

Q: You have a diamond but are not sure whether its a real or a fake one. You show the diamond to two experts who independently estimate the probability that it is real at \(p_1\) and \(p_2\). What is your estimate of what the true probability is?

Canon EOS Rebel T3 12.2 MP CMOS Digital SLR Camera with EF-S 18-55mm f/3.5-5.6 IS II Zoom Lens & EF 75-300mm f/4-5.6 III Telephoto Zoom Lens + 10pc Bundle 16GB Deluxe Accessory Kit

A: Surprisingly, there is no clear answer or strategy on how to approach and blend such subjective estimates together. Most people run into similar situations all the time wherein they get estimates from different sources on a fixed decision they need to make.

A naive way to approach this would be to average the two estimates. This would yield \(\frac{p_1 + p_2}{2}\) in the present case. But this doesn't address all the cases. For example if \(p_1 = p_2 = 0.6\), i.e. the experts agree independently the overall estimate has to be greater than 0.6. This is because the fact that they agree is worth something from an information perspective. A good approach then is to resort to a Bayesian perspective.

Let \(p\) be the sort estimate. The new estimate can be computed as
$$
\frac{p}{1 - p} = \frac{p_0}{1 - p_0}\times \frac{p_1}{1- p_1} \times \frac{p_2}{1 - p_2}
$$

In the above formulation, \(p_0\) is our prior estimate. As we typically don't have a prior to go by, we can assume that to be \(\frac{1}{2}\) and the term \(\frac{p_0}{1 - p_0}\) becomes 1.

Watch what happens when we plug in \(0.6\) into the above formula,
$$
\frac{p}{1-p} = \frac{0.6}{1 - 0.6}\times \frac{0.6}{1 - 0.6} = \frac{9}{13} = 69\%
$$

It works out to be greater than\(60\%\) as expected. Also notice another elegant property, if both experts give an uncertain \(50\%\) each, the final estimate remains \(50\%\) as it intuitively should.

If you are looking to buy some books in probability here are some of the best books to learn the art of Probability

BookNotes/Comments
Fifty Challenging Problems in Probability with Solutions (Dover Books on Mathematics)This book is a great compilation that covers quite a bit of puzzles. What I like about these puzzles are that they are all tractable and don't require too much advanced mathematics to solve.
Introduction to AlgorithmsThis is a book on algorithms, some of them are probabilistic. But the book is a must have for students, job candidates even full time engineers & data scientists
Introduction to Probability TheoryOverall an excellent book to learn probability, well recommended for undergrads and graduate students
An Introduction to Probability Theory and Its Applications, Vol. 1, 3rd EditionThis is a two volume book and the first volume is what will likely interest a beginner because it covers discrete probability. The book tends to treat probability as a theory on its own
The Probability Tutoring Book: An Intuitive Course for Engineers and Scientists (and Everyone Else!) A good book for graduate level classes: has some practice problems in them which is a good thing. But that doesn't make this book any less of buy for the beginner.
Introduction to Probability, 2nd EditionA good book to own. Does not require prior knowledge of other areas, but the book is a bit low on worked out examples.
Bundle of Algorithms in Java, Third Edition, Parts 1-5: Fundamentals, Data Structures, Sorting, Searching, and Graph Algorithms (3rd Edition) (Pts. 1-5)An excellent resource (students, engineers and even entrepreneurs) if you are looking for some code that you can take and implement directly on the job
Understanding Probability: Chance Rules in Everyday LifeThis is a great book to own. The second half of the book may require some knowledge of calculus. It appears to be the right mix for someone who wants to learn but doesn't want to be scared with the "lemmas"
Data Mining: Practical Machine Learning Tools and Techniques, Third Edition (The Morgan Kaufmann Series in Data Management Systems)This one is a must have if you want to learn machine learning. The book is beautifully written and ideal for the engineer/student who doesn't want to get too much into the details of a machine learned approach but wants a working knowledge of it. There are some great examples and test data in the text book too.
Discovering Statistics Using R This is a good book if you are new to statistics & probability while simultaneously getting started with a programming language. The book supports R and is written in a casual humorous way making it an easy read. Great for beginners. Some of the data on the companion website could be missing.
A Course in Probability Theory, Third EditionCovered in this book are the central limit theorem and other graduate topics in probability. You will need to brush up on some mathematics before you dive in but most of that can be done online
Probability and Statistics (4th Edition)This book has been yellow-flagged with some issues: including sequencing of content that could be an issue. But otherwise its good



Comments

  1. "It works out to be greater than 60% as expected. Also notice another elegant property, if both experts give an uncertain 50% each, the final estimate remains 50% as it intuitively should."

    By your formula, won't (0.5/(1-0.5)) * (0.5/(1-0.5)) = 1?

    ReplyDelete
  2. Thats the odds ratio. An odds ratio of 1 implies 50% probability.

    ReplyDelete

Post a Comment

Popular posts from this blog

The Best Books to Learn Probability

If you are looking to buy some books in probability here are some of the best books to learn the art of Probability The Probability Tutoring Book: An Intuitive Course for Engineers and Scientists (and Everyone Else!) A good book for graduate level classes: has some practice problems in them which is a good thing. But that doesn't make this book any less of buy for the beginner. An Introduction to Probability Theory and Its Applications, Vol. 1, 3rd Edition This is a two volume book and the first volume is what will likely interest a beginner because it covers discrete probability. The book tends to treat probability as a theory on its own Discovering Statistics Using R This is a good book if you are new to statistics & probability while simultaneously getting started with a programming language. The book supports R and is written in a casual humorous way making it an easy read. Great for beginners. Some of the data on the companion website could be missing. Fifty Cha

The Best Books for Linear Algebra

The following are some good books to own in the area of Linear Algebra. Linear Algebra (2nd Edition) This is the gold standard for linear algebra at an undergraduate level. This book has been around for quite sometime a great book to own. Linear Algebra: A Modern Introduction Good book if you want to learn more on the subject of linear algebra however typos in the text could be a problem. Linear Algebra (Dover Books on Mathematics) An excellent book to own if you are looking to get into, or want to understand linear algebra. Please keep in mind that you need to have some basic mathematical background before you can use this book. Linear Algebra Done Right (Undergraduate Texts in Mathematics) A great book that exposes the method of proof as it used in Linear Algebra. This book is not for the beginner though. You do need some prior knowledge of the basics at least. It would be a good add-on to an existing course you are doing in Linear Algebra. Linear Algebra, 4th Ed

Fun with Uniform Random Numbers

Q: You have two uniformly random numbers x and y (meaning they can take any value between 0 and 1 with equal probability). What distribution does the sum of these two random numbers follow? What is the probability that their product is less than 0.5. The Probability Tutoring Book: An Intuitive Course for Engineers and Scientists A: Let z = x + y be the random variable whose distribution we want. Clearly z runs from 0 to 2. Let 'f' denote the uniform random distribution between [0,1]. An important point to understand is that f has a fixed value of 1 when x runs from 0 to 1 and its 0 otherwise. So the probability density for z, call it P(z) at any point is the product of f(y) and f(z-y), where y runs from 0 to 1. However in that range f(y) is equal to 1. So the above equation becomes From here on, it gets a bit tricky. Notice that the integral is a function of z. Let us take a look at how else we can simply the above integral. It is easy to see that f(z-y) = 1 when (