This spring, I’m teaching a graduate-level special topics course called “Mathematics of Data Science” at the Ohio State University. This will be a research-oriented class, and in lecture, I plan to cover some of the important ideas from convex optimization, probability, dimensionality reduction, clustering, and sparsity.
Click here for a draft of my lecture notes.
The current draft consists of a chapter on convex optimization. I will update the above link periodically. Feel free to comment below.
UPDATE #1: Lightly edited Chapter 1 and added a chapter on probability.
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. Suppose you have 
distinct numbers in some field. Is it necessarily possible to arrange the numbers into an 
matrix? (The answer depends on whether you consider 
to be prime.) Recently, Boris reminded me of his email, and I finally bothered to solve it. His hint: Apply ![[0,w]\times\mathbb{R}](https://s0.wp.com/latex.php?latex=%5B0%2Cw%5D%5Ctimes%5Cmathbb%7BR%7D&bg=ffffff&fg=303030&s=0 "[0,w]\times\mathbb{R}")
is k-colorable. Then of course 
and 
for every 
. Furthermore,
![\mathbb{Z}[\omega_1,\omega_3,\omega_4]](https://s0.wp.com/latex.php?latex=%5Cmathbb%7BZ%7D%5B%5Comega_1%2C%5Comega_3%2C%5Comega_4%5D&bg=ffffff&fg=303030&s=0 "\mathbb{Z}[\omega_1,\omega_3,\omega_4]")
to an infinite strip.