Skip to main content
eigenchris's user avatar
eigenchris's user avatar
eigenchris's user avatar
eigenchris
  • Member for 9 years, 11 months
  • Last seen more than a month ago
  • Canada
Stats
5,821
reputation
2k
reached
0
answers
1
question
Loading…
About

I have studied physics and electrical engineering at the undergraduate level, and computer vision at the graduate level. I am currently working as a software developer.

When it comes to programming and computer science, I am largely self-taught. I'm always trying to learn more.


Programming links:

AI Shack and Mathworks computer vision tutorials.

Getting started with MATLAB.

Divakar's profile - a list of functions that will make you a better MATLAB programmer if you learn how to use them.

NumPy for MATLAB users; also check out the Spyder IDE.

Image processing with NumPy/SciPy.

C pointers - a wonderful video series that clears up all confusion. It also explains function pointers.

CIS-194 Haskell course - a good introduction to Haskell with some pretty cool exercises.

The Y-Combinator - a simple explanation of how to achieve recursion in lambda calculus.


Math links:

Better Explained - great articles on the intuition/visualization of math concepts.

Math Doctor Bob - videos on university-level pure mathematics like abstract algebra.

Introduction to differential forms - videos explaining a more elegant approach to multivariable calculus that emphasizes geometry without coordinate systems.

Snoopy Topology Notes - an introduction to topology written by students who took a class at Colorado State (it possibly contains mistakes, but it's a nice gentle introduction to the basic ideas for the beginner).

Differential Geometry Notes - succinct notes on classical differential geometry with great figures for visualization.

Category Theory for Programmers - category theory explained through C++ and Haskell. Pretty much the only introduction to category theory that I find readable at my level of experience.

Simple Explanation of Gödel's Proof - a really good introduction to Gödel's First Incompleteness Theorem. (Note the author believes the theorem is flawed, but he explains it well.)

This user doesn’t have any gold badges yet.
10
silver badges
6
bronze badges
Top tags
0
Score
1
Posts
100
Posts %
0
Score
1
Posts
100
Posts %
0
Score
1
Posts
100
Posts %
Top posts
question
98
Mar 4, 2015