Say you have an array for which the ith element is the price of a given stock on day i.
Design an algorithm to find the maximum profit. You may complete at most two transactions.
Note: You may not engage in multiple transactions at the same time (i.e., you must sell the stock before you buy again).
Example 1:
Input: [3,3,5,0,0,3,1,4] Output: 6 Explanation: Buy on day 4 (price = 0) and sell on day 6 (price = 3), profit = 3-0 = 3. Then buy on day 7 (price = 1) and sell on day 8 (price = 4), profit = 4-1 = 3.
Example 2:
Input: [1,2,3,4,5] Output: 4 Explanation: Buy on day 1 (price = 1) and sell on day 5 (price = 5), profit = 5-1 = 4. Note that you cannot buy on day 1, buy on day 2 and sell them later, as you are engaging multiple transactions at the same time. You must sell before buying again.
Example 3:
Input: [7,6,4,3,1] Output: 0 Explanation: In this case, no transaction is done, i.e. max profit = 0.
题目大意:与之前的题目类似,不过这次有次数限制。最多两次买卖,问最大获利。
思路:如果将数组拆成两半,那么每一半都可以用Best Time to Buy and Sell Stock I 题目中的方式获取到最大获利,前后加起来,就是最大获利。用left[i]表示从0到i的最大获利,遍历一遍可求得。用right[i]表示从i到length-1的最大获利,从右向左遍历一遍可获得。从左往右遍历时,一边找最小price一边更新max获利;从右往左遍历时,一边找最大price,一边更新当前max获利。两遍遍历,时间复杂度O(n),讨论区还有一遍遍历的解法,有兴趣可以去看看。
public static int maxProfit(int[] prices) { if (prices == null || prices.length <= 1) { return 0; } int[] left = new int[prices.length]; int[] right = new int[prices.length]; int min = prices[0]; for (int i = 1; i < prices.length; i++) { left[i] = Math.max(prices[i] - min, left[i - 1]); min = Math.min(min, prices[i]); } int max = prices[prices.length - 1]; int res = 0; for (int i = prices.length - 2; i >= 0; i--) { right[i] = Math.max(max - prices[i], right[i + 1]); max = Math.max(max, prices[i]); res = Math.max(left[i] + right[i], res); } return res; }