Leetcode 更新题目啦!!!
Find the contiguous subarray within an array (containing at least one number) which has the largest product.
For example, given the array [2,3,-2,4],
the contiguous subarray [2,3] has the largest product = 6.
首先想到就是动态规划利用path[i][j] 记录i到j 的乘积,计算过程中更新最大值代码如下:
public class Solution {
public int maxProduct(int[] A) {
int len = A.length;
int [][] path = new int[len][];
for(int i=0;i<len;i++){
path[i] = new int[len];
}
int MaxPro = Integer.MIN_VALUE;
path[0][0] = A[0];
for(int i=1;i<len;i++){
path[i][i] = A[i];
path[0][i] = path[0][i-1] * A[i];
if(A[i]>MaxPro){
MaxPro = A[i];
}
if(path[0][i]>MaxPro){
MaxPro = path[0][i];
}
}
for(int i=1;i<len;i++){
for(int j=i+1;j<len;j++){
path[i][j] = path[i][j-1] * A[j];
if(path[i][j]>MaxPro){
MaxPro = path[i][j];
}
}
}
return MaxPro;
}
}
提交发现出现超时错误,因为测试案例中有一个很长的数组,上面方法需要开辟很大的数组并填写数组比较耗时O(n^2)。
其实分析一下可以发现,一次循环其实就可以解决问题,因为数组中出现正数负数,所以我们需要记录到某个位置时的最大值与最小值,因为最小值可能在下一步乘以负数就变成最大值啦。
代码如下:
public class Solution {
public int maxProduct(int[] A){
if(A.length < 1){
return 0;
}
int min_temp = A[0];
int max_temp = A[0];
int result = A[0];;
for(int i=1;i<A.length;i++){
int a = max_temp * A[i];
int b = min_temp * A[i];
int c = A[i];
max_temp = Math.max(Math.max(a, b), c);
min_temp = Math.min(Math.min(a, b), c);
result = max_temp>result? max_temp:result;
}
return result;
}
}
原文:http://blog.csdn.net/huruzun/article/details/39523165