title: WOJ1022 Competition of Programming 贪心
date: 2020-03-19 13:43:00
categories: acm
tags: [acm,woj,贪心]
贪心。
1 描述
There are many good reasons for participating in programming contests. You can have fun while you improve both your programming
skills and job prospects in the bargain. From somewhere in this vein arises TopCoder, a company which uses programming contests as a
tool to identify promising potential employees and provides this information to its clients.
The format of TopCoder contests is evolving quickly as they hunt for the most appropriate business model. Preliminary rounds are
held over the web, with the final rounds of big tournaments held on site. Each of these rounds shares the same basic format. The coders
are divided into ?rooms? where they compete against the other coders. Each round starts with a coding phase of 75?80 minutes where the
contestants do their main programming. The score for each problem is a decreasing function of the time from when it was first opened to
when it was submitted. There is then a 15-minute challenge phase where coders get to view the submissions from other contestants in their
room and try to find bugs. Coders earn additional points by submitting a test case that breaks another competitor?s program. There is no
partial credit for incorrect solutions. Is it very interesting and exciting for participating in TopCoder and you just want to participate
it right now?
Now, WOJ (Wuhan University Online Judge) development group will introduce the TopCoder contest format into WOJ. Of course, there
will be something different from TopCoder and we will set some new regulations into WOJ?s TopCoder. Here is one of these regulations: in
the coding phase, we will set the finish time limit T and penalty C for each problem. If you don?t solve the i-th problem in the finish time
limit Ti, your penalty will be added by Ci. Note that the penalty here is completely different from the penalty in ACM. The penalty in WOJ?s
TopCoder is a value set by us and is be independent of the problem solving time.
Assume that you are a genius in programming and it takes only one time unit for you to solve one problem whatever the problem is.
Now, there are N problems in WOJ?s TopCoder contest and the finish time limit and penalty of each problem is given, please write a program
to calculate minimum penalty you will get.
输入格式
Standard input will contain multiple test cases. The first line of the input is a single integer T (1 <= T <= 50) which is the number of test cases.
The first line of each test case contains only one integer N (1 <= N <= 3000) which specify the total problem numbers. The next N lines each contains the description for one problem, the first integer T (1 <= T <= 3000) specifying the finish time limit and the second integer C (1 <= C <= 50000) specifying the penalty.
输出格式
Results should be directed to standard output. Start each case with "Case #:" on a single line, where # is the case number starting from 1. Two consecutive cases should be separated by a single blank line. No blank line should be produced after the last test case.
For each test case, print one integer, the minimum penalty described as above.
样例输入
2
3
1 5
3 2
3 4
3
1 5
2 2
2 4
样例输出
Case 1:
0
Case 2:
2
2 分析
// 贪心。和上学期算法期末考试一道题很像。
//这里读题的时候想了一会儿才发现每道题没有说完成耗时,那么就是说一个时间点就完成了
//期末那道题还考虑到占用时间,这里占用时间就是1
//总之就算每道题尽量拖到允许时间的最后再执行,这样可以给其他题留下更多时间。(像一条线段上窗口越靠后越好)
//因为这里还有罚时,贪心策略是罚时越高越先优执行
//所以先根据罚时排序,然后从高优先级的problem开始,尽量靠后的找到时间点;
3 code
#include<iostream>
#include<algorithm>
#include<cstring>
using namespace std;
struct problem{
int time,penalty;
bool operator <(const problem &tmp)const{
return penalty>tmp.penalty;
}
};
/*
if(a.grade != b.grade)
return a.grade < b.grade;
else if(t != 0)
return t < 0;
else
return a.age < b.age;
*/
problem probs[3005];
int T=0,casee=0,n;
bool vis[3005];
// 50000*3000=150000000=1.5e8. [-2^31,2^31),即-2147483648~2147483647约等于2e9,没超
int solve()
{
int res = 0;
memset(vis, 0, sizeof(vis));
for(int i = 0; i < n; i++){
bool ok = false;
for(int j= probs[i].time; j >= 1; j--) { //time 从 1开始所以>=1
if(!vis[j]) { //还没被占用,就在这里完成
vis[j] = true;
ok = true;
break;
}
}
if(!ok) res += probs[i].penalty;
}
return res;
}
int main(){
cin>>T;
while(T--){
cin>>n;
if(casee!=0)
cout<<endl;
casee++;
printf("Case %d:
",casee);
for(int i=0;i<n;i++)
cin>>probs[i].time>>probs[i].penalty;
sort(probs,probs+n);
printf("%d
",solve());
}
system("pause");
return 0;
}
title: WOJ1023 Division dp
date: 2020-03-19 13:43:00
categories: acm
tags: [acm,woj,dp]
动态规划
1 描述
输入格式
Standard input will contain multiple test cases. The first line of the input is a single integer T (1 <= T <= 50) which is the number of test cases.
Each test case begins with a line containing two integers n (1 <= n <= 100) and p (1 <= p <= n), where n represents the size of the set and p represents the least number of elements each cluster must contain. The second line contains positive integers (you are ensured that the value of each integer is less than 2^16), which are separated by a white space denoting the elements of the set.
输出格式
Results should be directed to standard output. Start each case with "Case #:" on a single line, where # is the case number starting from 1. Two consecutive cases should be separated by a single blank line. No blank line should be produced after the last test case.
For each test case, you should output one line containing a floating number, which is the minimum sum of the squared deviation of the numbers from their cluster mean. The answer should be accurate to two fractional digits.
样例输入
2
2 1
1 2
2 2
1 2
样例输出
Case 1:
0.00
Case 2:
0.50
2 分析
给出一个集合大小为n,要把内部的元素分成clusters(簇),每个簇至少大小为p
每个簇S均值S'为 ai求和/|S| |S|为簇S的size
每个簇的值为内部元素 (ai-S'^2)之和
求各个簇如何分,值之和最小
Each cluster contains consecutive number cluster内的数字是连续的
前面的分簇结果可以被后面利用
dp 状态转移方程: f[i]=min(f[i],f[j]+valuecluser[j+1][i])(i-j>=p) //j+1...(注意分界点)
dp[0]=0.i in range p-1-N (编号为1-n)
//dp注意初始状态结束状态预处理。f[0]=0,f[i]初始为maxd
预处理:计算valuecluster[i][j]
3 code
#include<iostream>
#include<algorithm>
#include<cstring>
#include<cmath> //pow
#include<algorithm> //min
using namespace std;
int T=0,casee=0,n,p,i,j,k;
const double maxd=1e15; //2^16*2^16*100 2E11
double summ[105][105]; //存连续数字和
int nums[105];
double clustervalue[105][105];
double f[105]; //dp
double dp(){
for(i=p;i<=n;i++)
for(j=i-p;j>=0;j--){ //一开始写成i-p+1了...
f[i]=min(f[i],f[j]+clustervalue[j+1-1][i-1]); //f[i]中元素编号+1,计算的时候注意减1
}
return f[n];
}
int main(){
cin>>T;
while(T--){
cin>>n>>p;
for(i=0;i<n;i++)
cin>>nums[i];
for(i=0;i<n;i++)
for(j=i;j<n;j++)
{
if(i==j)
summ[i][j]=nums[i];
else
summ[i][j]=summ[i][j-1]+nums[j];
}
for(i=0;i<n;i++)
for(j=i;j<n;j++)
{
clustervalue[i][j]=0;
}
for(i=0;i<n;i++)
for(j=i+p-1;j<n;j++)
{
double avg=summ[i][j]*1.0/(j-i+1);
for(k=i;k<=j;k++)
clustervalue[i][j]+=pow(nums[k]-avg*1.0,2);
}
for(i=1;i<=n;i++)
f[i]=maxd;
f[0]=0; //初始状态
if(casee!=0)
cout<<endl;
casee++;
printf("Case %d:
",casee);
printf("%.2lf
",dp());
}
system("pause");
return 0;
}