目录
0/1背包问题理论基础
二维dp数组
一维dp数组
LeeCode 416. 分割等和子集
0/1背包问题理论基础
二维dp数组
动规五部曲
1.确定dp数组及下标含义: dp[i][j] : 从下标为[0-i]的物品里任意取,放进容量为j的背包,价值总和的最大值;
2.确定递推公式:dp[i][j] = max(dp[i - 1][j], dp[i - 1][j - weight[i]] + value[i]);
3.dp数组如何初始化:
vector<vector<int>> dp(weight.size(), vector<int>(bagweight + 1, 0));
for (int j = weight[0]; j <= bagweight; j++) {
dp[0][j] = value[0];
}
4.确定遍历顺序:物品遍历的for循环放在外层,遍历背包的for循环放在内层;
5.举例递推dp数组
测试代码:
void test1() {
vector<int> weight = {1, 3, 4};
vector<int> value = {15, 20, 30};
int bagweight = 4;
vector<vector<int>> dp(weight.size(), vector<int>(bagweight + 1, 0));
for (int j = weight[0]; j <= bagweight; j++) {
dp[0][j] = value[0];
}
for (int i = 1; i < weight.size(); i++) {
for (int j = 0; j <= bagweight; j++) {
if (j < weight[i]) dp[i][j] = dp[i - 1][j];
else dp[i][j] = max(dp[i - 1][j], dp[i - 1][j - wight[i]] + value[i]);
}
}
cout << dp[weight.size() - 1][bagweight] << endl;
}
int main() {
test1();
}一维dp数组
动规五部曲
1.确定dp数组及下标含义: dp[j] : 容量为j的背包,所背的物品价值最大值;
2.确定递推公式:dp[j] = max(dp[j], dp[j - weight[i]] + value[i]);
3.dp数组如何初始化:dp[0] = 0;
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4.确定遍历顺序:物品遍历的for循环放在外层,遍历背包的for循环放在内层,且内层for循环倒序遍历;
for(int i = 0; i < weight.size(); i++) { // 遍历物品
for(int j = bagWeight; j >= weight[i]; j--) { // 遍历背包容量
dp[j] = max(dp[j], dp[j - weight[i]] + value[i]);
}
}5.举例递推dp数组
测试代码:
void test2() {
vector<int> weight = {1, 3, 4};
vector<int> value = {15, 20, 30};
int bagweight = 4;
vector<int> dp(bagweight + 1, 0);
for (int i = 0; i < weight.size(); i++) {
for (int j = bagweight; j >= weight[i]; j--) {
dp[j] = max(dp[i], dp[j - weight[i]] + value[i]);
}
}
cout << dp[bagweight] << endl;
}
int main() {
test2();
}LeeCode 416. 分割等和子集
思路:
1.确定dp数组及下标含义: dp[j] : 容量为j的背包,所背的物品价值最大值;
2.确定递推公式:dp[j] = max(dp[j], dp[j - weight[i]] + value[i]);
3.dp数组如何初始化:dp[0] = 0;
4.确定遍历顺序:物品遍历的for循环放在外层,遍历背包的for循环放在内层,且内层for循环倒序遍历;
5.举例递推dp数组
代码:
class Solution {
public:
bool canPartition(vector<int>& nums) {
int sum = 0;
vector<int> dp(10001, 0);
for (int i = 0; i < nums.size(); i++) {
sum += nums[i];
}
if (sum % 2 == 1) return false;
int target = sum / 2;
for (int i = 0; i < nums.size(); i++) {
for (int j = target; j >= nums[i]; j--) {
dp[j] = max(dp[j], dp[j - nums[i]] + nums[i]);
}
}
if (dp[target] == target) return true;
return false;
}
};时间复杂度:O(n²) 空间复杂度:O(n)