Given an array of 2n integers, your task is to group these integers into n pairs of integer, say (a1, b1), (a2, b2), ..., (an, bn) which makes sum of min(ai, bi) for all i from 1 to n as large as possible.
Example 1:
Input: [1,4,3,2] Output: 4 Explanation: n is 2, and the maximum sum of pairs is 4 = min(1, 2) + min(3, 4).
Note:
- n is a positive integer, which is in the range of [1, 10000].
- All the integers in the array will be in the range of [-10000, 10000].
- 解法:
class Solution(object): def arrayPairSum(self, nums): """ :type nums: List[int] :rtype: int """ # [1,4,3,2]=>sort, [1,2,3,4]=>1+3=4 # [1,2,3,5,12,19,20,21]=>sorted => greedy, 1+3+12+20 nums.sort() return sum(nums[0::2])
我自己想的是贪心思路,
先假设这个数组排序了,例如:[1,2,3,5,12,19,20,21]
min(ai, bi)明显是Min(20,21),因为21最大。
剩下的就是递归解:
[1,2,3,5,12,19】
思路类似。
其他人的分析:
Let me try to prove the algorithm…
- Assume in each pair
i,bi >= ai. - Denote
Sm = min(a1, b1) + min(a2, b2) + ... + min(an, bn). The biggestSmis the answer of this problem. Given1,Sm = a1 + a2 + ... + an. - Denote
Sa = a1 + b1 + a2 + b2 + ... + an + bn.Sais constant for a given input. - Denote
di = |ai - bi|. Given1,di = bi - ai. DenoteSd = d1 + d2 + ... + dn. - So
Sa = a1 + a1 + d1 + a2 + a2 + d2 + ... + an + an + dn = 2Sm + Sd=>Sm = (Sa - Sd) / 2. To get the maxSm, givenSais constant, we need to makeSdas small as possible. - So this problem becomes finding pairs in an array that makes sum of
di(distance betweenaiandbi) as small as possible. Apparently, sum of these distances of adjacent elements is the smallest. If that’s not intuitive enough, see attached picture. Case 1 has the smallestSd.
其他解法就是trick,利用All the integers in the array will be in the range of [-10000, 10000].hash来做桶排序。
class Solution(object): def arrayPairSum(self, nums): """ :type nums: List[int] :rtype: int """ # bucket sort num_range = 20001 sort_map = [0]*num_range for n in nums: sort_map[n+10000] += 1 ans = 0 odd = True for i in range(0, num_range): while sort_map[i]: if odd: ans += (i-10000) sort_map[i] -= 1 odd = not odd return ans