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How are paged binary trees different from AVL trees and/or B-trees?

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So far I haven't had an explanation of what a paged binary tree is. –  neuromancer Apr 29 '10 at 7:53
    
There’s a simple reason: I just overlooked that word completely. Apologies. Can’t really help you there but a quick search found this, which looks promising: isqa.unomaha.edu/haworth/isqa3300/fs010.htm –  Konrad Rudolph Apr 29 '10 at 8:54

2 Answers 2

In spite of the different structure of AVL and B-tree as stated by Konrad, usage of AVL and B-tree is also different, I think. B-tree generally used to implement indexing. Purpose of employing B-tree is to reduce disk I/O, while data of AVL-tree often resists totally in memory instead of partially in memory partially on disk like B-tree. Purpose of AVL-tree is to avoid the appearance of left/right branch tree in some extreme situation ensuring a perfect O(logn) time complexity when doing search operation.

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Historically, you’re right. However, “recent” developments in hardware have shifted the balance massively in favour of B trees, due to cache locality issues. In fact, B trees that use cache lines optimally tend to outperform binary trees everywhere. For more information, have a look at the excellent study at idlebox.net/2007/stx-btree, in particular the benchmarks: idlebox.net/2007/stx-btree/stx-btree-0.8.3/doxygen-html/… –  Konrad Rudolph Apr 29 '10 at 8:48
    
@Konrad: Thanx:-) –  Summer_More_More_Tea Apr 29 '10 at 13:05

I suggest reading the excellent Wikipedia articles on the topic.

Very briefly:

  • AVL trees are binary search trees (i.e. binary trees used to impose an ordering on its elements). The difference is that AVL trees implement a self-balancing strategy to distribute the nodes evenly as to reduce the maximum depth of the tree.
  • B trees are a generalization of binary search trees, i.e. they are no longer binary.
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