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