# How to represent a binomial tree in memory

I've got such a structure, is described as a "binomial tree". Let'see a drawing:

Which is the best way to represent this in memory? Just to clarify, is not a simple binary tree since the node N4 is both the left child of N1 and the right child of N2, the same sharing happens for N7 and N8 and so on... I need a construction algorithm tha easily avoid to duplicates such nodes, but just referencing them.

UPDATE Many of us does not agree with the "binomial tree deefinition" but this cames from finance ( expecially derivative pricing ) have a look here: http://http.developer.nvidia.com/GPUGems2/gpugems2_chapter45.html for example. So I used the "Domain acceted definition".

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That's not even a tree. And the actual binomial tree looks different. –  svick Feb 18 '12 at 13:20
Also, what do you mean by “best”? What are you looking for? Code readability? Memory footprint? Performance? Isn't a simple type with `left` and `right` references enough? –  svick Feb 18 '12 at 13:22
@svick well I mean a way of generating it without duplicating the nodes... –  Felice Pollano Feb 18 '12 at 13:44
This isn't a binomial tree. It looks more like a deap. –  templatetypedef Feb 19 '12 at 7:10
@templatetypedef well is defined as that in some field of finance: http.developer.nvidia.com/GPUGems2/gpugems2_chapter45.html btw what's a deap ? You mean heap ? –  Felice Pollano Feb 19 '12 at 8:52

You could generate the structure level by level. In each iteration, create one level of nodes, put them in an array, and connect the previous level to them. Something like this (C#):

``````Node GenerateStructure(int levels)
{
Node root = null;

Node[] previous = null;

for (int level = 1; level <= levels; level++)
{
int count = level;

var current = new Node[count];

for (int i = 0; i < count; i++)
current[i] = new Node();

if (level == 1)
root = current[0];

for (int i = 0; i < count - 1; i++)
{
previous[i].Left = current[i];
previous[i].Right = current[i + 1];
}

previous = current;
}

return root;
}
``````

The whole structure requires O(N^2) memory, where N is the number of level. This approach requires O(N) additional memory for the two arrays. Another approach would be to generate the graph from left to right, but that would require O(N) additional memory too.

The time complexity is obviously O(N^2).

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More than a tree, of which I would give a definition like 'connected graph of N vertex and N-1 edges', that structure seems like a Pascal (or Tartaglia, as teached in Italy) triangle. As such, an array with a suitable indexing suffices.

Details on construction depends on your data input: please give some more hint.

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ok the Tartaglia triangle would probably be the way to go by indexing the node in some index based on the triangle level. –  Felice Pollano Feb 18 '12 at 14:37