Book list From Michael Jordan
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Disclaimer: This is from hacker news on https://news.ycombinator.com/item?id=1055389.
Mike Jordan at Berkeley sent me his list on what people should learn for ML. The list is definitely on the more rigorous side (ie aimed at more researchers than practitioners), but going through these books (along with the requisite programming experience) is a useful, if not painful, exercise. I personally think that everyone in machine learning should be (completely) familiar with essentially all of the material in the following intermediate-level statistics book:
1.) Casella, G. and Berger, R.L. (2001). “Statistical Inference” Duxbury Press.
For a slightly more advanced book that’s quite clear on mathematical techniques, the following book is quite good:
2.) Ferguson, T. (1996). “A Course in Large Sample Theory” Chapman & Hall/CRC.
You’ll need to learn something about asymptotics at some point, and a good starting place is:
3.) Lehmann, E. (2004). “Elements of Large-Sample Theory” Springer.
Those are all frequentist books. You should also read something Bayesian:
4.) Gelman, A. et al. (2003). “Bayesian Data Analysis” Chapman & Hall/CRC.
and you should start to read about Bayesian computation:
5.) Robert, C. and Casella, G. (2005). “Monte Carlo Statistical Methods” Springer.
On the probability front, a good intermediate text is:
6.) Grimmett, G. and Stirzaker, D. (2001). “Probability and Random Processes” Oxford.
At a more advanced level, a very good text is the following:
7.) Pollard, D. (2001). “A User’s Guide to Measure Theoretic Probability” Cambridge.
The standard advanced textbook is Durrett, R. (2005). “Probability: Theory and Examples” Duxbury.
Machine learning research also reposes on optimization theory. A good starting book on linear optimization that will prepare you for convex optimization:
8.) Bertsimas, D. and Tsitsiklis, J. (1997). “Introduction to Linear Optimization” Athena.
And then you can graduate to:
9.) Boyd, S. and Vandenberghe, L. (2004). “Convex Optimization” Cambridge.
Getting a full understanding of algorithmic linear algebra is also important. At some point you should feel familiar with most of the material in
10.) Golub, G., and Van Loan, C. (1996). “Matrix Computations” Johns Hopkins.
It’s good to know some information theory. The classic is:
11.) Cover, T. and Thomas, J. “Elements of Information Theory” Wiley.
Finally, if you want to start to learn some more abstract math, you might want to start to learn some functional analysis (if you haven’t already). Functional analysis is essentially linear algebra in infinite dimensions, and it’s necessary for kernel methods, for nonparametric Bayesian methods, and for various other topics. Here’s a book that I find very readable:
12.) Kreyszig, E. (1989). “Introductory Functional Analysis with Applications” Wiley.
Just as the buddy in the thread said, Michael himself is a super machine in Math and it’s nearly impossible for we common people to read all these books. But we can try our best to read more.
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