Possible database queries for binary trees: search your data / browse all statistics / browse all maps

1. Definition & Example

A binary tree is a rooted tree where each node is either internal (has two children) or is a leaf (has no children).
Equivalently, a binary tree is recursively defined to be either an empty tree (leaf) or an ordered pair of binary trees (internal node).

The five binary trees with 3 internal nodes

`[.,[.,[.,.]]]`	`[.,[[.,.],.]]`	`[[.,.],[.,.]]`	`[[.,[.,.]],.]`	`[[[.,.],.],.]`

The graphical representation omits the leafs and only shows the internal nodes.
There are $\operatorname{Cat}(n) = \frac{1}{n+1}\binom{2n}{n}$ binary trees with $n$ internal nodes, see OEIS:A000108.

2. Additional information

Feel free to add further information on the combinatorics of binary trees here!

3. References

Wikipedia

4. Sage examples

5. Technical information for database usage

A binary tree is uniquely represented as a dot (empty tree) or as a sorted list of binary trees.
Binary trees are graded by the number of internal nodes.
The database contains all binary trees of size at most 8.