http://codeforces.com/contest/703/problem/E
题意:给定一个最多个数的序列,从中选出最少个数的数字,使得他们的乘积是k的倍数,若有多种选择方式,输出选出数字和最小的一种,若有多种,输出任意一种。
动态规划,dp[i][j]表示从前i个数里选,所得乘积是j的倍数。显然dp[i][j]=max(dp[i-1][j],dp[i-1][j/gcd(j,a[i])])。由于k可能很大,所以只需令j分别等于k的每个约数即可。
确定k的约数的时候令i从1到sqrt(k)循环判断,注意由于k很大,这里的i要使用longlong。
#include<bits/stdc++.h>
using namespace std;
#define ft first
#define sd second
#define mp make_pair
long long a[], k, f[], b[];
int fc, n;
pair<int, long long> dp[][];
map<long long , int> e;
int main()
{
//freopen("input.txt", "r", stdin);
scanf("%d%I64d", &n, &k);
long long t = k;
for (int i = ; i <= n; i++)
{
scanf("%I64d", &a[i]);
b[i] = __gcd(k, a[i]);
t /= __gcd(t, a[i]);
}
if (t != )
{
printf("-1\n");
return ;
}
if (k == )
{
printf("1\n%d\n", (int)(min_element(a + , a + n + ) - a));
return ;
}
e.clear();
fc = ;
for (long long i = ; i * i <= k; i++)
{
if (k % i != ) continue;
f[fc++] = i;
if (i * i != k) f[fc++] = k / i;
}
sort(f, f + fc);
for (int i = ; i < fc; i++)
e[f[i]] = i;
for (int i = ; i < fc; i++)
dp[][i] = mp(n + , );
dp[][] = mp(, );
for (int i = ; i <= n; i++)
for (int j = ; j < fc; j++)
{
dp[i][j] = dp[i - ][j];
long long v = e[f[j] / __gcd(f[j], b[i])];
if (dp[i][j] > mp(dp[i - ][v].ft + , dp[i - ][v].sd + a[i]))
dp[i][j] = mp(dp[i - ][v].ft + , dp[i - ][v].sd + a[i]);
}
printf("%d\n", dp[n][fc - ].ft);
t = k;
for (int i = n; i > ; i--)
{
if (dp[i][e[t]] == dp[i - ][e[t]]) continue;
printf("%d ", i);
t /= __gcd(t, b[i]);
}
printf("\n");
//fclose(stdin);
return ;
}