2925. Maximum Score After Applying Operations on a Tree
Description
There is an undirected tree with n
nodes labeled from 0
to n - 1
, and rooted at node 0
. You are given a 2D integer array edges
of length n - 1
, where edges[i] = [ai, bi]
indicates that there is an edge between nodes ai
and bi
in the tree.
You are also given a 0-indexed integer array values
of length n
, where values[i]
is the value associated with the ith
node.
You start with a score of 0
. In one operation, you can:
- Pick any node
i
. - Add
values[i]
to your score. - Set
values[i]
to0
.
A tree is healthy if the sum of values on the path from the root to any leaf node is different than zero.
Return the maximum score you can obtain after performing these operations on the tree any number of times so that it remains healthy.
Example 1:
Input: edges = [[0,1],[0,2],[0,3],[2,4],[4,5]], values = [5,2,5,2,1,1] Output: 11 Explanation: We can choose nodes 1, 2, 3, 4, and 5. The value of the root is non-zero. Hence, the sum of values on the path from the root to any leaf is different than zero. Therefore, the tree is healthy and the score is values[1] + values[2] + values[3] + values[4] + values[5] = 11. It can be shown that 11 is the maximum score obtainable after any number of operations on the tree.
Example 2:
Input: edges = [[0,1],[0,2],[1,3],[1,4],[2,5],[2,6]], values = [20,10,9,7,4,3,5] Output: 40 Explanation: We can choose nodes 0, 2, 3, and 4. - The sum of values on the path from 0 to 4 is equal to 10. - The sum of values on the path from 0 to 3 is equal to 10. - The sum of values on the path from 0 to 5 is equal to 3. - The sum of values on the path from 0 to 6 is equal to 5. Therefore, the tree is healthy and the score is values[0] + values[2] + values[3] + values[4] = 40. It can be shown that 40 is the maximum score obtainable after any number of operations on the tree.
Constraints:
2 <= n <= 2 * 104
edges.length == n - 1
edges[i].length == 2
0 <= ai, bi < n
values.length == n
1 <= values[i] <= 109
- The input is generated such that
edges
represents a valid tree.
Solutions
Solution 1: Tree DP
The problem is actually asking us to select some nodes from all nodes of the tree so that the sum of these nodes’ values is maximized, and there is one node on each path from the root node to the leaf node that is not selected.
We can use the method of tree DP to solve this problem.
We design a function $dfs(i, fa)$, where $i$ represents the current node with node $i$ as the root of the subtree, and $fa$ represents the parent node of $i$. The function returns an array of length $2$, where $[0]$ represents the sum of the values of all nodes in the subtree, and $[1]$ represents the maximum value of the subtree satisfying that there is one node not selected on each path.
The value of $[0]$ can be obtained directly by DFS accumulating the values of each node, while the value of $[1]$ needs to consider two situations, namely whether node $i$ is selected. If it is selected, then each subtree of node $i$ must satisfy that there is one node not selected on each path; if it is not selected, then all nodes of each subtree of node $i$ can be selected. We take the maximum of these two situations.
It should be noted that the value of $[1]$ of the leaf node is $0$, because the leaf node has no subtree, so there is no need to consider the situation where there is one node not selected on each path.
The answer is $dfs(0, -1)[1]$.
The time complexity is $O(n)$, and the space complexity is $O(n)$. Here, $n$ is the number of nodes.
|
|
|
|
|
|
|
|
|
|