# Prerequisites for understanding Wavelet theory

I have a degree in computer science and I have taken the following math courses.

• Calculus I
• Calculus II
• Discrete Mathematics and Number Theory
• Linear Algebra
• Probability
• Logic
• Automata Theory

What other courses should I take in order to prepare for studying wavelets, with a focus of implementing wavelet transforms?

EDIT:

Looks like this was closed for not being "programming related". That is wrong!

Wavelet transform is a very common image processing technique, it's used in H.264 and JPEG2000. Is image processing beyond the scope of StackOverflow?

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If you know your linear algebra well, that's really all you need to know. However, very few people really know linear algebra after one course. –  Stephen Canon Sep 21 '09 at 3:09
Why is this closed? It's very programming related. –  joemoe Sep 21 '09 at 3:31
if it doesn't get reopened, try here gamedev.net/community/forums/forum.asp?forum_id=20 –  Dustin Getz Sep 21 '09 at 4:02
Of course this is programming related. Does anyone in this forum ever actually study for their profession? Its freakin' embarrassing. –  RBarryYoung Sep 21 '09 at 4:03
For the record, you should probably know and understand Fourier Transforms, since Wavelet Transforms are a concept derived from them. –  RBarryYoung Sep 21 '09 at 4:04
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On top of what you've got there already, I would recommend signal processing or some similar course that covers Fourier transforms and the like. Besides being useful as a foundation for wavelets, Fourier theory will give you a new way of looking at data that is often useful. Wavelets will probably be part of the curriculum for more advanced signal processing courses.

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+1 for Signal Processing. Understanding aliasing and other SP concepts help! –  Hannes Ovrén Oct 1 '09 at 10:50

Linear algebra and calculus may help you there, but not much else. You'll also want to look at complex analysis and differential equations.

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False. If you want to understand the math behind wavelet compression, and most importantly quantify the compression error, you'll have to understand difficult exotic functional analysis topics like Besov spaces and weak-L^p. –  Alexandre C. Feb 20 '11 at 11:18
Old comment, but which part of my answer was false? I stated that, of the topics he listed, linear algebra and calculus were the useful ones. –  Chris Simmons Feb 23 '11 at 23:55