After a bit of investigation I believe that I figured it out.
Header
libstdc++
's implementation of std::map
has an additional node at the very top of the tree. It is called Header, it has its left child pointing to the leftmost leaf of the whole tree, its right child pointing to the rightmost leaf of the whole tree, while its parent is actually the Root node. Thus it helps getting constant time access time to the smallest and the largest keys in the tree (faster begin()
and rbegin()
operations). The Root node's parent also points to the Header node creating a parent loop with these two nodes.
end iterator
As it was answered by Davis Herring, this is used also to handle end()
case of the iterators. The most naive implementation of the end
iterator would simply contain a null
pointer. If we get to the point, where the next node would be null
, that is the end
. It works flawlessly... until you need to go back. std::map
's iterators are bidirectional and you have to be able to decrement the end
iterator and get the rightmost element of the tree.
Header as the end
Here is where the Header node helps again. While searching for the next node in the inorder traversal, we end up getting up to the parent of the Root node. We didn't come to the Header node from the right (nor from the left, for that matter) child and we return it as a successor. This way it is natural to have Header as the end
iterator node. And this is why the condition for the predecessor computation checks for a node with a grandparent equal to itself. This is how we can check that we are in the Header node. This also explains why we go to the right child: Header's right child is the rightmost node of the tree and this is the predecessor of the end
in the inorder traversal.
Wait... but what about the color
Yeah, the previous part has one significant mistake. There are two nodes with their grandparent equal to this node: the Header and the Root. They are undistinguishable from this perspective. We need to have a separate flag for the Header node.
However, every node in a red-black tree already has a boolean flag: color. And we also have a very nice property of a red-black tree: the Root is always black.
Putting it all together, we can omit additional flag altogether and color the Header red. This will be the distinguishing property for two nodes with a grandparent loop.