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.

Interesting asides:

- 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.