标签:tac less backtrac size ++ for ica sub too
Given a set of distinct integers, nums, return all possible subsets.
Note: The solution set must not contain duplicate subsets.
For example,
If nums = [1,2,3], a solution is:
[
[3],
[1],
[2],
[1,2,3],
[1,3],
[2,3],
[1,2],
[]
]
思路:
首先排序,然后回溯法。
void backtracking(vector<vector<int>>& subs,vector<int>& sub,vector<int>& nums,int start) { subs.push_back(sub); for(int i = start;i<nums.size();i++) { sub.push_back(nums[i]); backtracking(subs,sub,nums,i+1); sub.pop_back(); } } vector<vector<int>> subsets(vector<int>& nums) { sort(nums.begin(),nums.end()); vector<vector<int>> subs; vector<int>sub; backtracking(subs,sub,nums,0); return subs; }
另外,leetcode上大神有更详细多样的方法解析,如下:
Recursive (Backtracking)
This is a typical problem that can be tackled by backtracking. Since backtracking has a more-or-less similar template, so I do not give explanations for this method.
class Solution {
public:
vector<vector<int>> subsets(vector<int>& nums) {
sort(nums.begin(), nums.end());
vector<vector<int>> subs;
vector<int> sub;
genSubsets(nums, 0, sub, subs);
return subs;
}
void genSubsets(vector<int>& nums, int start, vector<int>& sub, vector<vector<int>>& subs) {
subs.push_back(sub);
for (int i = start; i < nums.size(); i++) {
sub.push_back(nums[i]);
genSubsets(nums, i + 1, sub, subs);
sub.pop_back();
}
}
};
Iterative
This problem can also be solved iteratively. Take [1, 2, 3]
in the problem statement as an example. The process of generating all the subsets is like:
[[]]
[[], [1]]
;[[], [1], [2], [1, 2]]
;[[], [1], [2], [1, 2], [3], [1, 3], [2, 3], [1, 2, 3]]
.Have you got the idea :-)
The code is as follows.
class Solution {
public:
vector<vector<int>> subsets(vector<int>& nums) {
sort(nums.begin(), nums.end());
vector<vector<int>> subs(1, vector<int>());
for (int i = 0; i < nums.size(); i++) {
int n = subs.size();
for (int j = 0; j < n; j++) {
subs.push_back(subs[j]);
subs.back().push_back(nums[i]);
}
}
return subs;
}
};
Bit Manipulation
This is the most clever solution that I have seen. The idea is that to give all the possible subsets, we just need to exhaust all the possible combinations of the numbers. And each number has only two possibilities: either in or not in a subset. And this can be represented using a bit.
There is also another a way to visualize this idea. That is, if we use the above example, 1
appears once in every two consecutive subsets, 2
appears twice in every four consecutive subsets, and 3
appears four times in every eight subsets, shown in the following (initially the 8
subsets are all empty):
[], [], [], [], [], [], [], []
[], [1], [], [1], [], [1], [], [1]
[], [1], [2], [1, 2], [], [1], [2], [1, 2]
[], [1], [2], [1, 2], [3], [1, 3], [2, 3], [1, 2, 3]
The code is as follows.
class Solution {
public:
vector<vector<int>> subsets(vector<int>& nums) {
sort(nums.begin(), nums.end());
int num_subset = pow(2, nums.size());
vector<vector<int> > res(num_subset, vector<int>());
for (int i = 0; i < nums.size(); i++)
for (int j = 0; j < num_subset; j++)
if ((j >> i) & 1)
res[j].push_back(nums[i]);
return res;
}
};
Well, just a final remark. For Python programmers, this may be an easy task in practice since the itertools
package has a function combinations
for it :-)
参考:
标签:tac less backtrac size ++ for ica sub too
原文地址:http://www.cnblogs.com/hellowooorld/p/6938565.html