I know about this question, but it's about B-tree and B+-tree. Sorry, if there's similar for B*-tree, but I couldn't find such.

So, what is the difference between these two trees? The wikipedia article about B*-trees is very short.

The only difference, that is noted there, is "non-root nodes to be at least 2/3 full instead of 1/2". But I guess there's something more.. There could be just one kind of tree - the B-tree, just with different constants (for the fullness of each non-root node), and no two different trees, if this was the only difference, right?

Also, one more thing, that made me thing about more differences:

"A B*-tree should not be confused with a B+ tree, which is one where the 
leaf nodes of the tree are chained together in the form of a linked list"

So, B+-tree has something really specific - the linked list. What is the specific characteristic of B*-tree, or there isn't such?

Also, there are no any external links/references in the wikipedia's article. Are there any resources at all? Articles, tutorials, anything?


  • "Not a real question" ? What is the "not real" part here? – Kiril Kirov May 31 '11 at 6:53
  • can you give a bit of context? if there's so little info about B*-trees, how did you become interested in them? a) out of curiosity, but also b) because it may help people think into the right direction – Nicolas78 May 31 '11 at 8:31
  • I haven't said, that "there's so little info about B*-trees". Short wikipedia article doesn't mean that there's no info in the net and that these trees are unfamiliar. Also, I don't think, that the reason I'm interested in B*-trees is important.. :) Anyway. I'm just learning advanced data structures and I didn't note any other differences, than the different fullness. And I wanted to ask for some help :) We're here for that, right? – Kiril Kirov May 31 '11 at 8:55
  • didn't mean to criticize the fact that you're asking. just had the intuition that if there's a particular use case, you might get additional answers. happens often to me: "no idea what that's... oh that's what he's talking about". nevermind :) – Nicolas78 May 31 '11 at 9:14
  • You're right, but no - no other information. Just out of curiosity (: – Kiril Kirov May 31 '11 at 9:55

Edited No difference other than min. fill factor.

Page #489

The Great Book

From the above book,

B*-tree is a variant of a B-tree that requires each internal node to be at least 2/3 full, rather than at least half full.

Knuth also defines the B* tree exactly like that (The art of computer programming, Vol. 3).

"The Ubiquitous B-Tree" has a whole sub-section on B*-trees. Here, Comer defines the B*-tree tree exactly as Knuth and Corment et al. do but also clarifies where the confusion comes from --B*-tree tree search algorithms and some unnamed B tree variants designed by Knuth which are now called B+-trees.

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    please at least give a brief paraphrasing of the content there, otherwise the answer is not useful to anyone not owning this book – blubb May 31 '11 at 10:39
  • @Simon: that said, it's an excellent book, even though the maths are sometimes daunting oO – Matthieu M. May 31 '11 at 13:33
  • I'm asking about B*, not B+ ;p – Kiril Kirov May 31 '11 at 15:05
  • Thanks, now you get +1 from me (: – Kiril Kirov May 31 '11 at 15:54
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    @Monster TrucK: +1. Thanks for taking the time! This is an awesome example of the SO community working just as intended :D – blubb May 31 '11 at 22:25

Maybe you should look at Ubiquitous B-Tree by Comer (ACM Computing Surveys, 1979).

Comer writes there something about the B*Tree (In the section B-Tree and its variants). And in that section, he also cites some more paper about that topic. That should help you to do further investigations on your own :)! (I'm not your researcher ;) )

However, I don't understand the point where you cite a part which says that the B*Tree does not have a linked list in the leaf node level. I'm pretty sure, that also those nodes are linked together.

Regarding having only one B-Tree. Actually, you have that. The other ones like B+Tree, Prefix B+Tree and so on are just variants of the standard B-Tree. Just look at the paper Ubiquitous B-Tree.

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  • Not yet. +1 from me for pointing me to the paper. I'll read it later, as I can't now. And no, I didn't post here, to find a "researcher", but just to ask someone to point me to some papers/tutorials/implementations/etc, as I already noted in my question ;) – Kiril Kirov May 31 '11 at 10:17

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