There are lots of questions around about redblack trees but none of them answer how they work. Why is it called redblack? How does this keep the tree balanced (thus increasing performance over an unbalanced normal binary search tree)? I'm just looking for an overview of how and why it works.

For searches and traversals, it's the same as any binary tree. For inserts and deletes, more sophisticated algorithms are applied which aim to ensure that the tree cannot be too unbalanced. These guarantee that all singleitem operations will always run in at worst O(log n) time, whereas in a simple binary tree the binary tree can become so unbalanced that it's effectively a linked list, giving O(n) worst case performance for each singleitem operation. The basic idea of the redblack tree is to imitate a Btree with up to 3 keys and 4 children per node. Btrees (or variations such as B+ trees) are mainly used for database indexes and for data stored on hard disk. Each binary tree node has a "colour"  red or black. Each black node is, in the Btree analogy, the subtree root for the subtree that fits within that Btree node. If this node has red children, they are also considered part of the same Btree node. So it is possible (though not done in practice) to convert a redblack tree to a Btree and back, with (most) structure preserved. The only possible anomoly is that when a Btree node has two keys and three children, you have a choice of which key to goes in the black node in the equivalent redblack tree. For example, with redblack trees, every line from root to leaf has the same number of black nodes. This rule is derived from the Btree rule that all leaf nodes are at the same depth. Although this is the basic idea from which redblack trees are derived, the algorithms used in practice for inserts and deletes are modified to enforce all the Btree rules (there might be a minor exception  I forget) during updates, but are tailored for the binary tree form. This means that doing a redblack tree insert or delete may give a different structure for the result than that you'd expect comparing with doing the Btree insert or delete. For more detail, follow the Wikipedia link that MigDus already supplied. 


A redblack tree is an ordered binary tree where each vertex is coloured red or black. The intuition is that a red vertex should be seen as being at the same height as its parent (i.e., an edge to a red vertex is thought of as "horizontal" rather than "descending"). [I don't believe the Wikipedia entry makes this point clear.] The usual rules for redblack trees require that a red vertex never point to another red vertex. This means that the possible vertex arrangements for any subtree rooted with a black vertex (bbb, bbr, rbb, rbr  for [left child][root][right child]) correspond to 234 trees. Searching a redblack tree is just the same as searching an ordinary binary tree. Insertion and deletion are similar, except that a "fixup" rotation may be required at some point to preserve the redblack invariant. Cheers! 

