[POJ2456]Aggressive cows
| Time Limit: 1000MS | Memory Limit: 65536K | |
| Total Submissions: 8760 | Accepted: 4350 |
Description
Farmer John has built a new long barn, with N (2 <= N <= 100,000) stalls. The stalls are located along a straight line at positions x1,...,xN (0 <= xi <= 1,000,000,000).
His C (2 <= C <= N) cows don't like this barn layout and become aggressive towards each other once put into a stall. To prevent the cows from hurting each other, FJ want to assign the cows to the stalls, such that the minimum distance between any two of them is as large as possible. What is the largest minimum distance?
His C (2 <= C <= N) cows don't like this barn layout and become aggressive towards each other once put into a stall. To prevent the cows from hurting each other, FJ want to assign the cows to the stalls, such that the minimum distance between any two of them is as large as possible. What is the largest minimum distance?
Input
* Line 1: Two space-separated integers: N and C
* Lines 2..N+1: Line i+1 contains an integer stall location, xi
* Lines 2..N+1: Line i+1 contains an integer stall location, xi
Output
* Line 1: One integer: the largest minimum distance
Sample Input
5 3 1 2 8 4 9
Sample Output
3
Hint
OUTPUT DETAILS:
FJ can put his 3 cows in the stalls at positions 1, 4 and 8, resulting in a minimum distance of 3.
Huge input data,scanf is recommended.
FJ can put his 3 cows in the stalls at positions 1, 4 and 8, resulting in a minimum distance of 3.
Huge input data,scanf is recommended.
Source
THINKING
最大化最小值的题。经分析,我们可以设C(D)=可以安排牛的位置使得任意的牛的间距都不小d,则用贪心法可以求解。首先对牛舍位置排序,把第一头牛放入x0的牛舍,如果第i头牛放入牛舍aj的话,第i+1头牛就要放入aj<=ak中,二分查找答案。
{《挑战ACM程序设计竞赛》} var n,m,lb,ub,mid:int64; i:longint; a:array[-1..10000] of int64; function c(x:int64):boolean; var last,crt:int64;j:longint; begin last:=0; //crt:=0; for j:=1 to m-1 do begin crt:=last+1; while (crt<n)and(a[crt]-a[last]<x) do inc(crt); if crt=n then exit(false); last:=crt; end; exit(true); end; procedure sort(l,r: int64); var i,j:longint;x,y:int64; begin i:=l; j:=r; x:=a[(l+r) div 2]; repeat while a[i]<x do inc(i); while x<a[j] do dec(j); if not(i>j) then begin y:=a[i]; a[i]:=a[j]; a[j]:=y; inc(i); j:=j-1; end; until i>j; if l<j then sort(l,j); if i<r then sort(i,r); end; begin readln(n,m); for i:=1 to n do readln(a[i]); sort(1,n); lb:=0; ub:=a[n]-a[1]+1; while ub-lb>1 do begin mid:=(lb+ub) div 2; if c(mid) then lb:=mid else ub:=mid; end; writeln(lb-1); end.
