# Is a tree with all black nodes a red black tree?

It seems the definition on wiki is not precise:

http://en.wikipedia.org/wiki/Red-black_tree#Properties

Is a tree with all black nodes a red black tree?

UPDATE

With the definition of rbtree not so strict,how do we decide whether to print the children of a black node as red or black?

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A red-black tree is simply a binary-tree representation of a 2-3-4 tree. Any red node in a red-black tree corresponds to a piece of its parent node in the analagous 2-3-4 tree. For example:

``````           [black 5]
/         \
[red 3]     [black 6]
/       \
[black 2] [black 4]
``````

is a representation of the 2-3-4 tree

``````    [3 | 5]
/   |   \
[2]  [4]  [6]
``````

If a red-black tree has only black nodes, that means it represents a 2-3-4 tree with only 2-nodes (single entries), not 3-nodes (such as `[3 | 5]` in the example) or 4-nodes. Notice this is basically just a plain binary search tree.

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Side-trivia: a node like `[3 | 5]` isn't called a 3-node because it has 3 elements (which it doesn't), but rather because it can have three children. –  jtbandes Jun 20 '11 at 3:59
@jtbandes,how do we decide whether to print the children of a black node as red or black? –  cpuer Jun 20 '11 at 5:34
@cpuer: if a black node's children are red, that means they're actually part of the same 2-3-4 node. I had `[red 3]` because it is actually `[3 | 5]` in the 2-3-4 version. –  jtbandes Jun 20 '11 at 5:36
@jtbandes,your version is totally different from the wiki page,why is it not mentioned at all? –  cpuer Jun 20 '11 at 5:39
It is mentioned briefly: "For every 2-4 tree, there are corresponding red–black trees with data elements in the same order. The insertion and deletion operations on 2-4 trees are also equivalent to color-flipping and rotations in red–black trees. This makes 2-4 trees an important tool for understanding the logic behind red–black trees, and this is why many introductory algorithm texts introduce 2-4 trees just before red–black trees, even though 2-4 trees are not often used in practice." (Note a 2-4 tree is the same as a 2-3-4 tree) –  jtbandes Jun 20 '11 at 5:42

It is possible to have a proper red-black tree that has all black nodes. Trivially, a RBTree with only one node, or with the only leaf nodes being direct children of the root, will be all back nodes.

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so the definition of rbtree is not strict,how do you define your exact rbtree? –  cpuer Jun 20 '11 at 3:57
@cpuer - I don't understand your question. A single-node tree (only a root) must be black. If the root has children that are leaves, those leaves must be black. It's only interior nodes that can end up being red - specifically, every node you add is colored red, until you determine whether it needs to be repainted. –  jwismar Jun 20 '11 at 4:02
every node you add is colored red, until you determine whether it needs to be repainted,why is this not mentioned in the wiki page? –  cpuer Jun 20 '11 at 5:19
@cpuer: It's under "Operations: Insertion". –  jwismar Jun 21 '11 at 2:03

To answer the second part of the question, about deciding whether to print a node as red or black, that information is stored in each node.

In a typical binary search tree, each node contains a value, a left pointer, and a right pointer (and maybe a parent pointer). In a red-black tree, each node contains all those things plus an extra field indicating whether this node is red or black. The various operations on the tree, such as insert or delete, are then responsible for maintaining this color information in a consistent fashion.

You would never be given an uncolored tree and told to choose colors for the nodes (except perhaps as a homework or exam question).

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To amplify, because I think this is where the original poster's misconception is, nodes always have a color, not just at print time. Those colors can change as part of the insert/delete operations, but a node color is always either red or black. The red-ness and black-ness are not just cosmetic, they are an integral part of how the data structure maintains its balance properties. –  Novak Feb 29 '12 at 19:20

Yes, a tree with all nodes black is a red-black tree. Moreover, the tree is also a perfect binary tree (all leaves are at the same depth or same level, and in which every parent has two children).

And it's the only tree whose Black height equals to its tree height.

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Yes, but the same is not true for a red-black tree with all red nodes. Such a tree is invalid. There are restrictions on which nodes have to be black. For example, leaf nodes have to be black, and the children of a red node both have to be black.

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how do we decide whether to print the children of a black node as red or black? –  cpuer Jun 20 '11 at 5:35
``````                            2,black