Sparse Segment Trees
Author: Andi Qu
Querying big ranges.
Prerequisites
Focus Problem – try your best to solve this problem before continuing!
In problems where the query range is at most something like , a normal segment tree suffices. However, as soon as we move to bigger ranges ( in some cases), a normal segment tree results in MLE.
Luckily, we can still use a segment tree to solve these types of problems.
Resources
The main idea is that we don't have to store all the nodes at all times - we create nodes only when needed. In a normal segment tree, an update only affects nodes, so in a sparse segment tree, we only store nodes!
We can implement this efficiently using pointers to a node's children - just like a trie! (Then again, a segment tree is basically a fancier binary trie.)
This section is not complete.
Resources | ||||
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Benq |
Pro Tip
Sparse Segment Tree is more commonly referred to as "Dynamic Segment Tree."
Solution
We need to support two operations on a range:
- Count the number of red-ripe trees in a range (range sum)
- Set all trees in a range to red-ripe (range paint)
We can use a segment tree with lazy propagation to solve this, but the query range is up to , so we have to use a sparse segment tree.
Luckily, lazy propagation still works here.
C++
#include <bits/stdc++.h>#pragma GCC optimize("O3")#define FOR(i, x, y) for (int i = x; i < y; i++)#define MOD 1000000007typedef long long ll;using namespace std;struct Node {int sum, lazy, tl, tr, l, r;Node() : sum(0), lazy(0), l(-1), r(-1) {}
Optional
It's possible to reduce the memory of a sparse segment tree to , as described here.
Problems
Some of these problems are solvable with a normal segment tree if you use coordinate compression. Sparse segment trees are rarely ever required to solve a particular problem, but they can make things a lot more convenient.
Status | Source | Problem Name | Difficulty | Tags | |
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IOI | Normal | ||||
Balkan OI | Normal |
Module Progress:
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