这题的描述比较复杂,就不说了。整个过程类似一个游戏,参数有天,生命值,胜利的概率,最后求最大存活的期望天数。
用dp[i][j]表示当前生命值为j,考虑了从i...N这些巫师的攻击。
有一点观察很重要,就是如果考虑巫师在同一天的话,那么安排他们的order与最后的结果是无关的,而对于每个巫师,要么攻击她,要么不攻击她。
还有一个要注意的是,巫师的状态决定了当天是那一天,而哪天并不能决定是哪个巫师,因此应该将巫师设为状态,而不应该是天。
由于下面的LP--后,后面忘了求的是原来的LP,导致最后的几个case wa掉了。
#include <iostream>
#include <string>
#include <vector>
#include <algorithm>
using namespace std;
const double EPS = 1e-6;
typedef pair<int, pair<int, int> > PIP;
double dp[55][100005];
bool cmp(PIP x, PIP y)
{
return x.first < y.first;
}
class MagicalGirl
{
public:
vector<PIP> witch;
int LP_M;
double go(int witchId, int LP)
{
int t_LP = LP;
if(dp[witchId][LP] != -1) return dp[witchId][LP];
LP--;
double res1, res2, res2_win, res2_lose;
if(witchId + 1 == witch.size() || LP - witch[witchId + 1].first + witch[witchId].first <= 0)
res1 = (witch[witchId].first + LP) * 1.0;
else res1 = go(witchId + 1, LP - witch[witchId + 1].first + witch[witchId].first + 1);
int gain = witch[witchId].second.second;
int i_win = witch[witchId].second.first;
double p_win = witch[witchId].second.first / 100.0;
int M = min(LP_M, LP + gain);
if(witchId + 1 == witch.size() || M - witch[witchId + 1].first + witch[witchId].first <= 0)
res2_win = (witch[witchId].first + M) * 1.0;
else res2_win = go(witchId + 1, M - witch[witchId + 1].first + witch[witchId].first + 1);
res2_lose = witch[witchId].first;
res2 = p_win * res2_win + (1 - p_win) * res2_lose;
//res2 = (i_win * res2_win + (100 - i_win) * res2_lose) / 100.0;
return dp[witchId][t_LP] = max(res1, res2);
}
double maxExpectation(int M, vector <int> d, vector <int> w, vector <int> g)
{
d.push_back(1);
w.push_back(100);
g.push_back(0);
for(int i = 0; i < d.size(); i++)
witch.push_back(make_pair(d[i], make_pair(w[i], g[i])));
sort(witch.begin(), witch.end(), cmp);
LP_M = M;
//fill(dp, -1, sizeof(dp));
for(int i = 0; i < 55; i++)
for(int j = 0; j < 100005; j++)
dp[i][j] = -1;
return go(0, M);
}
};