题目:
Given a collection of intervals, merge all overlapping intervals.
For example,
Given [1,3],[2,6],[8,10],[15,18],
return [1,6],[8,10],[15,18].
代码:
/** * Definition for an interval. * struct Interval { * int start; * int end; * Interval() : start(0), end(0) {} * Interval(int s, int e) : start(s), end(e) {} * }; */ class Solution { public: static bool comp(Interval a, Interval b) { return a.start < b.start; } static vector<Interval> merge(vector<Interval>& intervals) { if (intervals.empty()) return intervals; vector<Interval> ret; std::sort(intervals.begin(), intervals.end(), Solution::comp); int start = intervals[0].start; int end = intervals[0].end; for ( int i=1; i<intervals.size(); ++i ) { if ( intervals[i].start>end ) { ret.push_back(Interval(start,end)); start = intervals[i].start; end = intervals[i].end; continue; } if ( intervals[i].start<=end ) { start = std::min(start, intervals[i].start); end = std::max(end, intervals[i].end); continue; } } ret.push_back(Interval(start,end)); return ret; } };
tips:
一开始理解题意有误,题中没说已经按照start对intervals排序了,所以先对intervals按照start排序(构造一个comp比较器)。接下来就是常规的思路了,每次判断当前interval的start end与之前start end的大小比较。
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还有一种解法是沿用insert interval这道题的思路,每次新插入一个interval即可,代码如下.
/** * Definition for an interval. * struct Interval { * int start; * int end; * Interval() : start(0), end(0) {} * Interval(int s, int e) : start(s), end(e) {} * }; */ class Solution { public: vector<Interval> merge(vector<Interval>& intervals) { vector<Interval> ret; for ( int i=0; i<intervals.size(); ++i ) { ret = Solution::insert(ret, intervals[i]); } return ret; } static vector<Interval> insert(vector<Interval>& intervals, Interval newInterval) { vector<Interval> ret; int i = 0; // search for start insert position for ( ; i<intervals.size(); ++i ) { if ( newInterval.start > intervals[i].end ) { ret.push_back(intervals[i]); } else { break; } } // newInterval larger than all the existed intervals if ( i==intervals.size() ) { ret.push_back(newInterval); return ret; } int start = std::min( intervals[i].start, newInterval.start ); // search for the end insert position for ( ;i<intervals.size();++i ) { if ( newInterval.end <= intervals[i].end ) break; } // newInterval end is larger than all the range if ( i==intervals.size() ) { ret.push_back(Interval(start, newInterval.end)); return ret; } if ( newInterval.end<intervals[i].start ) { ret.push_back(Interval(start,newInterval.end)); ret.insert(ret.end(), intervals.begin()+i, intervals.end()); return ret; } if ( newInterval.end==intervals[i].start ) { ret.push_back(Interval(start,intervals[i].end)); if ( i<intervals.size()-1 ) { ret.insert(ret.end(), intervals.begin()+i+1, intervals.end()); } return ret; } if ( newInterval.end > intervals[i].start ) { ret.push_back(Interval(start,intervals[i].end)); if ( i<intervals.size()-1 ) { ret.insert(ret.end(), intervals.begin()+i+1,intervals.end()); } return ret; } return ret; } };
tips:这相当于是对一个区间进行插入排序,之前做的都是针对数字进行插入排序。这道题考察的点还是很好的。
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第二次过这道题,就是先按照start进行排序,再merge。
/** * Definition for an interval. * struct Interval { * int start; * int end; * Interval() : start(0), end(0) {} * Interval(int s, int e) : start(s), end(e) {} * }; */ class Solution { public: static bool compare(Interval a, Interval b) { return a.start < b.start; } vector<Interval> merge(vector<Interval>& intervals) { vector<Interval> ret; if ( intervals.empty() ) return ret; sort(intervals.begin(), intervals.end(), Solution::compare); ret.push_back(*intervals.begin()); for ( vector<Interval>::iterator i=intervals.begin()+1; i!=intervals.end(); ++i ) { if ( i->start > ret.back().end ) { ret.push_back(*i); } else { ret.back().start = min(ret.back().start, i->start); ret.back().end = max(ret.back().end, i->end); } } return ret; } };