[HIHO1143]骨牌覆盖问题·一(矩阵快速幂,递推)

时间:2023-03-09 01:26:06
[HIHO1143]骨牌覆盖问题·一(矩阵快速幂,递推)

题目链接:http://hihocoder.com/problemset/problem/1143

这个递推还是很经典的,结果是斐波那契数列。f(i) = f(i-1) + f(i-2)。数据范围太大了,应该用快速幂加速下。

     /*

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 ┓┏┓┏┓┃キリキリ♂ mind!

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 ┓┏┓┏┓┃ /

 ┛┗┛┗┛┃ノ)

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 ┻┻┻┻┻┻

 */

 #include <algorithm>

 #include <iostream>

 #include <iomanip>

 #include <cstring>

 #include <climits>

 #include <complex>

 #include <fstream>

 #include <cassert>

 #include <cstdio>

 #include <bitset>

 #include <vector>

 #include <deque>

 #include <queue>

 #include <stack>

 #include <ctime>

 #include <set>

 #include <map>

 #include <cmath>

 using namespace std;

 #define fr first

 #define sc second

 #define cl clear

 #define BUG puts("here!!!")

 #define W(a) while(a--)

 #define pb(a) push_back(a)

 #define Rint(a) scanf("%d", &a)

 #define Rll(a) scanf("%lld", &a)

 #define Rs(a) scanf("%s", a)

 #define Cin(a) cin >> a

 #define FRead() freopen("in", "r", stdin)

 #define FWrite() freopen("out", "w", stdout)

 #define Rep(i, len) for(int i = 0; i < (len); i++)

 #define For(i, a, len) for(int i = (a); i < (len); i++)

 #define Cls(a) memset((a), 0, sizeof(a))

 #define Clr(a, x) memset((a), (x), sizeof(a))

 #define Full(a) memset((a), 0x7f7f7f, sizeof(a))

 #define lrt rt << 1

 #define rrt rt << 1 | 1

 #define pi 3.14159265359

 #define RT return

 #define lowbit(x) x & (-x)

 #define onenum(x) __builtin_popcount(x)

 typedef long long LL;

 typedef long double LD;

 typedef unsigned long long ULL;

 typedef pair<int, int> pii;

 typedef pair<string, int> psi;

 typedef pair<LL, LL> pll;

 typedef map<string, int> msi;

 typedef vector<int> vi;

 typedef vector<LL> vl;

 typedef vector<vl> vvl;

 typedef vector<bool> vb;

 const int mod = ;

 const int maxn = ;

 LL n;

 typedef struct Matrix {

     LL m[maxn][maxn];

     int r;

     int c;

     Matrix(){

         r = c = ;

         memset(m, , sizeof(m));

     }

 } Matrix;

 Matrix mul(Matrix m1, Matrix m2, int mod) {

     Matrix ans = Matrix();

     ans.r = m1.r;

     ans.c = m2.c;

     for(int i = ; i <= m1.r; i++) {

         for(int j = ; j <= m2.r; j++) {

                for(int k = ; k <= m2.c; k++) {

                 if(m2.m[j][k] == ) continue;

                 ans.m[i][k] = ((ans.m[i][k] + m1.m[i][j] * m2.m[j][k] % mod) % mod) % mod;

             }

         }

     }

     return ans;

 }

 Matrix quickmul(Matrix m, int n, int mod) {

     Matrix ans = Matrix();

     for(int i = ; i <= m.r; i++) {

         ans.m[i][i]  = ;

     }

     ans.r = m.r;

     ans.c = m.c;

     while(n) {

         if(n & ) {

             ans = mul(m, ans, mod);

         }

         m = mul(m, m, mod);

         n >>= ;

     }

     return ans;

 }

 int main() {

     // FRead();

     while(cin >> n) {

         Matrix p, q;

         p.r = p.c = ;

         p.m[][] = ; p.m[][] = ;

         p.m[][] = ; p.m[][] = ;

         q.r = ; q.c = ;

         if(n <= ) {

             cout << n << endl;

             continue;

         }

         q = quickmul(p, n-, mod);

         cout << (q.m[][] + q.m[][]) % mod << endl;

     }

     RT ;

 }