# number of k-ary tree from pre-order and post-order traversals

Suppose pre-order and post-order traversals and k are given. How many k-ary trees are there with these traversals?

An k-ary tree is a rooted tree for which each vertex has at most k children.

-
Why are traversals relevant for the number of trees? –  Henry Jan 9 '13 at 8:58
@Henry : you know , you cant construct a tree from pre-order and post-order traversals uniquely, but I wanna know hom many trees have these traversals . –  elahe Jan 9 '13 at 9:05
can you give an example were two different trees have the same pre- AND post-order traversal? –  Henry Jan 9 '13 at 9:12
@Henry : see this link :geeksforgeeks.org/… –  elahe Jan 9 '13 at 9:36

It depends on the particular traversal pair. For instance

``````pre-order:  a b c
post-order: b c a
``````

describes only one possible tree (the fewest possible, unless you include inconsistent traversal pairs). On the other hand:

``````pre-order:  a b c
post-order: c b a
``````

describes 2^(3-1) = 4 trees (the most possible amongst all scenarios where the traversals have 3 nodes and k can be anything), namely the 4 3-node lines.

-

If you want to know the number of possible binary trees having Pre-order and Post-order traversals, you should first draw one possible tree. then count the number of nodes with only one child. The total number of possible trees would be : 2^(Number of single-child nodes)

as an example: pre: adbefgchij post: dgfebijhca

i draw one tree that has 3 single-child nodes. So , the number of possible trees is 8.

-

First determine the corresponding range of sub-tree by DFS, and get the amount of sub-tree, then solve it through combination of the sub-trees.

``````const int maxn = 30;
int C[maxn][maxn];
char pre[maxn],post[maxn];
int n,m;

void prepare()
{
memset(C,0,sizeof(C));
for(int i=0;i<maxn;i++)
{
C[i][0] = 1;
}
for(int i=1;i<maxn;i++)
{
for(int j=1;j<=i;j++)
{
C[i][j] = C[i-1][j-1] + C[i-1][j];
}
}
return;
}

int dfs(int rs,int rt,int os,int ot)
{
if(rs == rt) return 1;
int son = 0,res = 1;
int l = rs + 1,r = os;
while(l <= rt)
{
while(r < ot)
{
if(pre[l] == post[r])
{
son++;
break;
}
r++;
}
res *= dfs(l , l + r - os , os , r);
l += r - os + 1;
rs = l - 1;
os = ++r;
}
return res * C[m][son];
}

int main()
{
prepare();
while(scanf("%d",&m) && m)
{
scanf("%s %s",pre,post);
n = strlen(pre);
printf("%d\n",dfs(0,n-1,0,n-1));
}
return 0;
}
``````
-