Many data structures store multi-way trees as binary trees using a representation called the "left-child, right-sibling" representation. What does this mean? Why would you use it?
The left-child, right-sibling representation (LCRS) is a way of encoding a multi-way tree (a tree structure in which each node can have any number of children) using a binary tree (a tree structure in which each node can have at most two children).
To motivate how this representation works, let's begin by considering a simple multi-way tree, like this one here:
(Apologies for the low-quality ASCII artwork!)
In this tree structure, we can navigate downward from any node in the tree to any of its children. For example, we can migrate from A to B, A to C, A to D, etc.
If we wanted to represent a node in a tree like this one, we would normally use some sort of node structure / node class like this one here (written in C++):
In the LCRS representation, we represent the multi-way tree in a way where each node requires at most two pointers. To do this, we will slightly reshape the tree. Rather than having each node in the tree store pointers to all of its children, we will structure the tree in a slightly different way by having each node store a pointer to just one of its children (in LCRS, the leftmost child). We will then have each node store a pointer to its right sibling, the next node in the tree that is the child of the same parent node. In the case of the above tree, we might represent the tree in the following way:
Notice that in this new structure it is still possible to navigate from a parent node to its kth child (zero-indexed). The procedure for doing so is the following:
For example, to find the third (zero-indexed child) of the root node A, we would descend to the leftmost child (B), then follow three right links (visiting B, C, D, and finally E). We then arrive at the node for E, which holds the third child of node A.
The main reason for representing the tree this way is that even though any node may have any number of children, the representation requires at most two pointers for each node: one node to store the leftmost child, and one pointer to store the right sibling. As a result, we can store the multiway tree using a much simpler node structure:
This node structure has exactly the same shape of a node in a binary tree (data plus two pointers). As a result, the LCRS representation makes it possible to represent an arbitrary multiway tree using just two pointers per node.
Let us now look at the time and space complexity of the two different representations of the multiway tree and some basic operations on it.
For starters, let us consider the space usage of the two different tree representations. In the standard multiway tree representation, each node needs space to store the following information:
In an n-node tree, there will be exactly n - 1 child pointers spread out across all of the nodes in the tree. As a result, the total amount of space required to store the entire tree is
If we were to store the child pointers using a standard dynamic array, then we would probably need two machine words (allocated size and logical size), one extra pointer (to the dynamically-allocated elements), plus some overhead due to overallocating the array to hold the pointers (totaling at most twice the total number of pointers, in most schemes). This gives a total space usage of a multi-way tree represented using the traditional structure and a dynamic array of
Let's contrast this with the LCRS representation. In that representation, every node stores exactly two pointers and the original data held in each node. That representation therefore uses a total of
Although both of the structures uses O(n) space, the LCRS representation uses far less memory. It saves on 2n machine words and n - 2 extra pointers. Consequently, the LCRS representation is far more compact. If we make the (reasonable) assumption that a machine word has the same size as a pointer, then the LCRS representation has 2n machine words overhead, while the multiway tree has 5n-2 machine words overhead. The overhead of the LCRS representation is therefore (in the limit) 40% of the overhead of the more traditional approach.
However, basic operations on the LCRS tree structure tend to take longer than their corresponding operations on the normal multi-way tree. Specifically, in a multi-way tree represented in the standard form (each node stores an array of child pointers), the time required to navigate from one node to its kth child is given by the time required to follow a single pointers. On the other hand, in the LCRS representation, the time required to do this is given by the time required to follow k + 1 pointers (one left child pointer, then k right child pointers). As a result, if the tree has a large branching factor, it can be much slower to do lookups in an LCRS tree structure than in the corresponding multiway tree structure.
We can therefore think of the LCRS representation as offering a time-space tradeoff between data structure storage space and access times. The LCRS representation has 40% of the memory overhead of the original multiway tree, while the multiway tree gives constant-time lookups of each of its children.
Because of the time-space tradeoff involved in the LCRS representation, the LCRS representation is typically not used unless one of two criteria hold:
Case (1) might arise if you needed to store a staggeringly huge multiway tree in main memory. For example, if you needed to store a phylogenetic tree containing many different species subject to frequent updates, then the LCRS representation might be appropriate.
Case (2) arises in specialized data structures in which the tree structure is being used in very specific ways. For example, many types of heap data structures that use multiway trees can be space optimized by using the LCRS representation. The main reason for this is that in heap data structures, the most common operations tend to be
Operation (1) can be done very efficiently in the LCRS representation. In an LCRS representation, the root of the tree never has a right child (since it has no siblings), and therefore removing the root simply means peeling off the root node and descending into its left subtree. From there, processing each child can be done by simply walking down the right spine of the remaining tree and processing each node in turn.
Operation (2) can be done very efficiently as well. Recall from above that in an LCRS representation, the root of a tree never has a right child. Therefore, it is very easy to join together two trees in LCRS representation as follows. Beginning with two trees like this:
We can fuse the trees together in this way:
This can be done in O(1) time, and is quite simple. The fact that the LCRS representation has this property means that many types of heap priority queues, such as the binomial heap or rank-pairing heap are typically represented as LCRS trees.
Hope this helps!