记录dp(i, j)表示前i种卡片的排列,使得LISNumber为j的方法数。
#include <iostream>
#include <vector>
#include <string>
#include <string.h>
using namespace std; typedef long long int64; const int M = ; int64 dpC[][];
int64 dpT[][];
int64 sum[];
int64 dp[][]; class LISNumber {
private:
vector<int> num;
public:
int64 f(int i, int j);
int count(vector <int> cardsnum, int K);
}; int64 C(int m, int n) {
if (m == || n == || m == n) {
return ;
}
if (dpC[m][n] != -) {
return dpC[m][n];
}
return dpC[m][n] = (C(m - , n) + C(m - , n - )) % M;
} // m plate, n ball
int64 T(int m, int n) {
// m >= 1
if (m == || n == ) {
return ;
}
if (dpT[m][n] != -) {
return dpT[m][n];
}
return dpT[m][n] = (T(m - , n) + T(m, n - )) % M;
} int64 LISNumber::f(int i , int j) {
if (i == ) {
if (j == num[]) {
return dp[i][j] = ;
} else {
return dp[i][j] = ;
}
}
if (j < num[i] || j > sum[i]) {
return dp[i][j] = ;
}
if (dp[i][j] != -) {
return dp[i][j];
} // num[i] <= j <= sum[i]
dp[i][j] = ;
for (int k = ; k <= num[i]; k++) {
dp[i][j] += (((C(j - k, num[i] - k) * T(sum[i] + - j, k)) % M) * f(i - , j - k)) % M;
dp[i][j] %= M;
}
return dp[i][j];
} int LISNumber::count(vector <int> cardsnum, int K)
{
num = cardsnum;
memset(dp, -, sizeof(dp));
memset(dpC, -, sizeof(dpC));
memset(dpT, -, sizeof(dpT));
memset(sum, , sizeof(sum));
sum[] = cardsnum[];
for (int i = ; i < cardsnum.size(); i++) {
sum[i] = sum[i - ] + cardsnum[i];
}
return (int)f(cardsnum.size() - , K);
}