There are two popular definitions of a B-tree where:
- Knuth Order (Order) is used by Knuth's definition
- CLRS Degree (Degree) is used in the definition in Cormen et al in Introduction to Algorithms (CLRS)
Both the Knuth order and the CLRS degree measure: min <= children <= max, the minimum and maximum children, (min, max), each internal node in the tree is allowed to have. Both definitions agree that the min can't be less than max/2:
Knuth Order, k | (min,max) | CLRS Degree, t
0 | - | –
1 | – | –
2 | – | –
3 | (2,3) | –
4 | (2,4) | t = 2
5 | (3,5) | –
6 | (3,6) | t = 3
7 | (4,7) | –
8 | (4,8) | t = 4
9 | (5,9) | –
10 | (5,10) | t = 5
Key similarities / differences:
- The Knuth order k is an index counting the maximum number of children. A Knuth order of k means every node must have a max = k, and a min = ceil(k/2). For example, (3,6) is a B-tree of Knuth order 6.
- The CLRS degree t is an index counting the minimum number of children. A CLRS degree of t means every node must have a min = t and a max = 2t. For example, (3,6) is a B-tree of CLRS degree 3
- In both definitions, it is the case the min = ceil(max / 2) and max = 2 * min.
In both definitions, it is the case that the number of keys is equal to the number of children minus one. So both the Knuth order and the CLRS degree are technically also counting minimum and maximum keys – as well as simultaneously counting the minimum and maximum children.
Knuth's definition allows trees (min,max), where max an is odd integer, but CLRS's definition ignores them. Any tree of the form (t, 2t-1) is invalid by CLRS's definition. For example a tree with (min,max) = (5,9) is a valid via Knuth's definition but invalid via CLRS's definition.
- Both definitions include 2-3-4 trees, which are trees with (min, max) = (2,4). It is a B-tree with Knuth order k = 4 and it's a CLRS B-tree with degree t = 2. These trees are closely related to Red-Black Trees.
- Only Knuth's definition includes 2-3 trees, where (min, max) = (2,3). A 2-3 tree is a Knuth B-tree with Knuth order k = 3. It is not a valid CLRS B-tree. It's a shame that CLRS don't include this tree because they are closely related to AA trees.