目录
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为什么要使用线段树
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什么是线段树
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线段树融合接口
package com.suanfa.segmentTree;
/**
* 融合接口
* @author Administrator
*
* @param <E>
*/
public interface Merger<E> {
//自定义融合规则
E merge(E a, E b);
}
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线段树实现
package com.suanfa.segmentTree;
/**
* 线段树(区间树)
* @author Administrator
*
*/
public class SegmentTree<E> {
private E[] tree;
private E[] data;
private Merger<E> merger;
public SegmentTree(E[] arr, Merger<E> merger){
this.merger = merger;
data = (E[])new Object[arr.length];
for(int i = 0 ; i < arr.length ; i ++)
data[i] = arr[i];
tree = (E[])new Object[4 * arr.length];
buildSegmentTree(0, 0, arr.length - 1);
}
// 在treeIndex的位置创建表示区间[l...r]的线段树
private void buildSegmentTree(int treeIndex, int l, int r){
if(l == r){
tree[treeIndex] = data[l];
return;
}
int leftTreeIndex = leftChild(treeIndex);
int rightTreeIndex = rightChild(treeIndex);
// int mid = (l + r) / 2;
int mid = l + (r - l) / 2;
buildSegmentTree(leftTreeIndex, l, mid);
buildSegmentTree(rightTreeIndex, mid + 1, r);
tree[treeIndex] = merger.merge(tree[leftTreeIndex], tree[rightTreeIndex]);
}
public int getSize(){
return data.length;
}
public E get(int index){
if(index < 0 || index >= data.length)
throw new IllegalArgumentException("Index is illegal.");
return data[index];
}
// 返回完全二叉树的数组表示中,一个索引所表示的元素的左孩子节点的索引
private int leftChild(int index){
return 2*index + 1;
}
// 返回完全二叉树的数组表示中,一个索引所表示的元素的右孩子节点的索引
private int rightChild(int index){
return 2*index + 2;
}
// 返回区间[queryL, queryR]的值
public E query(int queryL, int queryR){
if(queryL < 0 || queryL >= data.length ||
queryR < 0 || queryR >= data.length || queryL > queryR)
throw new IllegalArgumentException("Index is illegal.");
return query(0, 0, data.length - 1, queryL, queryR);
}
// 在以treeIndex为根的线段树中[l...r]的范围里,搜索区间[queryL...queryR]的值
private E query(int treeIndex, int l, int r, int queryL, int queryR){
if(l == queryL && r == queryR)
return tree[treeIndex];
int mid = l + (r - l) / 2;
// treeIndex的节点分为[l...mid]和[mid+1...r]两部分
int leftTreeIndex = leftChild(treeIndex);
int rightTreeIndex = rightChild(treeIndex);
if(queryL >= mid + 1)
return query(rightTreeIndex, mid + 1, r, queryL, queryR);
else if(queryR <= mid)
return query(leftTreeIndex, l, mid, queryL, queryR);
E leftResult = query(leftTreeIndex, l, mid, queryL, mid);
E rightResult = query(rightTreeIndex, mid + 1, r, mid + 1, queryR);
return merger.merge(leftResult, rightResult);
}
// 在以treeIndex为根的线段树中更新index的值为e
private void set(int treeIndex, int l, int r, int index, E e){
if(l == r){
tree[treeIndex] = e;
return;
}
int mid = l + (r - l) / 2;
// treeIndex的节点分为[l...mid]和[mid+1...r]两部分
int leftTreeIndex = leftChild(treeIndex);
int rightTreeIndex = rightChild(treeIndex);
if(index >= mid + 1)
set(rightTreeIndex, mid + 1, r, index, e);
else // index <= mid
set(leftTreeIndex, l, mid, index, e);
tree[treeIndex] = merger.merge(tree[leftTreeIndex], tree[rightTreeIndex]);
}
@Override
public String toString(){
StringBuilder res = new StringBuilder();
res.append('[');
for(int i = 0 ; i < tree.length ; i ++){
if(tree[i] != null)
res.append(tree[i]);
else
res.append("null");
if(i != tree.length - 1)
res.append(", ");
}
res.append(']');
return res.toString();
}
}
package com.suanfa.segmentTree;
/// 303. Range Sum Query - Immutable
/// https://leetcode.com/problems/range-sum-query-immutable/description/
/**
* 求一个数组的区间和
* @author Administrator
*
*/
class NumArray {
private SegmentTree<Integer> segmentTree;
public NumArray(int[] nums) {
if(nums.length > 0){
Integer[] data = new Integer[nums.length];
for (int i = 0; i < nums.length; i++)
data[i] = nums[i];
segmentTree = new SegmentTree<Integer>(data, new Merger<Integer>() {
@Override
public Integer merge(Integer a, Integer b) {
return a+b;
}
});
}
}
public int sumRange(int i, int j) {
if(segmentTree == null)
throw new IllegalArgumentException("Segment Tree is null");
return segmentTree.query(i, j);
}
}
/*
public class NumArray2 {
private int[] sum; // sum[i]存储前i个元素和, sum[0] = 0
// 即sum[i]存储nums[0...i-1]的和
// sum(i, j) = sum[j + 1] - sum[i]
public NumArray2(int[] nums) {
sum = new int[nums.length + 1];
sum[0] = 0;
for(int i = 1 ; i < sum.length ; i ++)
sum[i] = sum[i - 1] + nums[i - 1];
}
public int sumRange(int i, int j) {
return sum[j + 1] - sum[i];
}
}
*/
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线段树例题
package com.suanfa.segmentTree;
/// 303. Range Sum Query - Immutable
/// https://leetcode.com/problems/range-sum-query-immutable/description/
/**
* 求一个数组的区间和
* @author Administrator
*
*/
class NumArray {
private SegmentTree<Integer> segmentTree;
public NumArray(int[] nums) {
if(nums.length > 0){
Integer[] data = new Integer[nums.length];
for (int i = 0; i < nums.length; i++)
data[i] = nums[i];
segmentTree = new SegmentTree<Integer>(data, new Merger<Integer>() {
@Override
public Integer merge(Integer a, Integer b) {
return a+b;
}
});
}
}
public int sumRange(int i, int j) {
if(segmentTree == null)
throw new IllegalArgumentException("Segment Tree is null");
return segmentTree.query(i, j);
}
}
/*
public class NumArray2 {
private int[] sum; // sum[i]存储前i个元素和, sum[0] = 0
// 即sum[i]存储nums[0...i-1]的和
// sum(i, j) = sum[j + 1] - sum[i]
public NumArray2(int[] nums) {
sum = new int[nums.length + 1];
sum[0] = 0;
for(int i = 1 ; i < sum.length ; i ++)
sum[i] = sum[i - 1] + nums[i - 1];
}
public int sumRange(int i, int j) {
return sum[j + 1] - sum[i];
}
}
*/
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