# B-Tree - I don't get the “minimal degree” thing

I'm trying to implement a B-Tree according to the chapter "B-Trees" in "Introduction To Algorithms"... what I don't quite get is the "minimal degree"... it says it's a number which expresses the lower/upper bound for the number of keys a node can hold. It it further says that:

1. every non-root node stores at least t-1 keys and has t children
2. every node stores at most 2t - 1 keys and has 2t children

So you get for t = 2

1. t-1 = 1 keys and t = 2 children
2. 2t-1 = 3 keys and 4 children

for t = 3

1. t-1 = 2 keys and t = 3 children
2. 2t-1 = 5 keys and 6 children

Now here's the problem: It seems that the nodes in a B-Tree can only store an odd number of keys (when full)?! Why can't there be a node with, let's say at most 4 keys and 5 children? Does it have something to do with splitting the node?

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It seems that the nodes in a B-Tree can only store an odd number of keys?

Definitely not. The numbers you have written is minimal/maximal respectively, so for t=2, nodes with 1,2,3 keys are allowed. For t=3, 2,3,4,5 is allowed, + the root of the tree is allowed to have only one key.

It is possible to define (and implement) trees that have eg. 1 or 2 keys in a node (so-called 2-3 trees). The reason B-trees are defined to accommodate one more, is that this leads to faster performance. Particularly, this allows amortized `O(1)` (counting splitting and joining operations) delete and insert operations.

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Of course you're right... what I meant was the case when the node is full - it then can only contain odd numbers of nodes. Still I don't get why this leads to better performance, see ire_and-curses comment. –  helpermethod Aug 19 '10 at 5:47
@Helper Method: Ok, so I think the second paragraph answers your question - do you need a formal proof? –  jpalecek Aug 19 '10 at 8:55

it's not impossible but suboptimal. how do you split a node with an odd number of children?

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I don't understand this argument. You take the median child, move it into the parent, and then assign all children rightwards of the median to a new sub-node of the parent. –  ire_and_curses Aug 18 '10 at 22:04