# create ancestor matrix for binary tree

``````     1
/  \
2    3
/ \   / \
4   5 6   7
``````

for the given binary tree we need to create a matrix a[7][7] satisfying the ancestor property like a[2][1]=1 since 1 is an ancestor of 2 ....

i solved it by using extra space an array ...the solution i came up is

``````int a[n][n]={0};
void updatematrix(int a[][n],struct node *root,int temp[],int index){

if(root == NULL)
return ;
int i;

for(i=0;i< index;i++)
a[root->data][temp[i]]=1;
temp[index]=root->data;

updatematrix(a,root->left,temp,index+1);
updatematrix(a,root->right,temp,index+1);
}
``````

is there any mistake in my solution ? can we do this inplace ???(i mean without using the temp array )

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@TedHopp i am new to this site ..can u pls say how to increase the accept rate ..? –  Sree Ram Sep 30 '12 at 19:25
I guess that in your code you need to replace the first occurence of `arr` by `a`, and replace the second occurrence of `arr` by `temp`. –  jrouquie Sep 30 '12 at 19:50
@jrouquie yup ..thank you ..edited .. –  Sree Ram Sep 30 '12 at 19:53
Go to some of the questions that you've asked (click on your name to see your profile, which includes links to all your questions). For any question that has answers, if one of the answers resolves your problem, click on the check mark next to the answer. This has several benefits: it lets others know that the question has been answered; it also lets others know which answer worked; it gives +15 reputation bonus to the person who provided the answer; it gives you +2 reputation bonus. –  Ted Hopp Sep 30 '12 at 19:59

`temp` contains the path from root to current node, i.e. the set of nodes visited while walking down the tree to arrive at the current node.

If you have a parent pointer in each node (but I guess not), you can follow those pointers and walk up the tree to traverse the same set of nodes as `temp`. But this uses more memory.

You can also walk down the tree several times (pseudocode):

``````def updatematrix(a,node):
if node is null: return
walkDown(a.data,node.left)
walkDown(a.data,node.right)
updatematrix(a,node.left)
updatematrix(a,node.right)

def walkDown(data,node):
if node is null: return
a[node][data] = 1
walkDown(data,node.left)
walkDown(data,node.right)
``````

Same complexity, but the pattern of memory access looks less cache friendly.

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