I want to find two paths in a tree with n nodes , so that this two paths don't have any common node and the multiplication of lengths of this two paths gets maximum . any one can help me how to solve this problem ?
First, generate a list of every possible unique path using a recursive procedure.
You end up with m possible paths.
Second, setup an array of m x m elements.
Check every one of the m paths with all the other m-1 paths and store into the array the multiplication of the respective length. Doing so check if the two path have nodes in common. If so store 0.
Third, check the m x m array for the element with the biggest value.
What else could you do? It's very brute-force but if no more informations is known about the tree properties this is the only way.
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Some thoughts. If there are two values a and b that add up to n, the maximum value of a*b is when a == b (for simplicity assume that n is even). If there is a path going through all n nodes cut it into two nearly equal parts. For such graphs for even n the answer will be (n^2) / 4 and for odd n it will be (n-1)/2 * (n+1)/2 = (n^2 - 1) / 4. If there is no path going through all n nodes you will have to use some other techniques. But The upper bounds are as above.