# Analyzing Recursive Algorithms

I've often been slightly stumped by recursive algorithms that seem to require magical leaps (with a large dose of shrunken notation born of an ink shortage) of logic.

I realize that the alternative is to simply memorize the Big O notation for all the common algorithms but at a certain point, that approach fails. For example, I am happy to disclose the performance for bubble sort, insertion sort, binary tree insertion/removal, mergesort, and quicksort but don't ask me to come up with the performance of AVL trees or Djikstra's shortest path algorithm off the top of my head.

Where can I go to get:

1. A discussion of recursive algorithm analysis that uses words instead of a profusion of symbols
2. Practice problems to confirm that my newly-obtained understanding is actually correct

Example:

Sigma v e T (1+cv)

Possible 'good' equivalent:

The amount of work required for 1 node in the tree (which is 1+the # of children of a node), which is then executed once for every element in the tree where the original node is the root.

Side commentary:

I could simply watch a video for every single algorithm because there's no way to make one's voice turn into a subscript (or any of the other contortions) but I suspect that would take an inordinate amount of time compared to reading textual descriptions.

Update:

Here's 1 source of solved problems: http://ocw.mit.edu/courses/electrical-engineering-and-computer-science/6-046j-introduction-to-algorithms-sma-5503-fall-2005/ (this tackles #2 above)

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You should learn to get comfortable with the communication of these ideas in symbols. It's efficient, precise, and the language that almost everyone uses. –  Jason Apr 2 '11 at 16:40
@Jason: If you are cs student or mathematical and theoratical focused. For a good programmer it should be enough to understand the meaning. –  Phpdna Apr 2 '11 at 16:44
+1 to Jason's point. For getting comfortable (and better than most people, actually!) with notation and analysis, I recommend the wonderful book Concrete Mathematics: A Foundation for Computer Science. Just the first two chapter should be enough (plus possibly the last), but it's so well written it's hard to resist reading the other chapters as well. –  ShreevatsaR Apr 3 '11 at 3:31
I should comment that I was dramatically underselling myself in the original post. :D I'm quite handy with things like sigmas, aleph-nulls, and so on. I just have trouble with the way the material is presented in the textbok that was required by my introductory class when I was getting my B.S (hence my commentary on ink shortages). –  Zian Choy Apr 14 '11 at 1:12

TopCoders has a great source of tutorials and thorough explanations. Have you tried them out?

http://www.topcoder.com/tc?d1=tutorials&d2=alg_index&module=Static

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Well, their particular tutorials on recursion (Part 1, Part 2), while very good, do not go into much detail of analysis. –  ShreevatsaR Apr 3 '11 at 3:25
I've reviewed the tutorials and must agree that there is almost nothing on analysis. –  Zian Choy Apr 14 '11 at 1:13