题目链接:http://acm.hdu.edu.cn/showproblem.php?pid=5015
看到这个限时,我就知道这题不简单~~矩阵快速幂,找递推关系
我们假设第一列为:
23
a1
a2
a3
a4
则第二列为:
23*10+3
23*10+3+a1
23*10+3+a1+a2
23*10+3+a1+a2+a3
23*10+3+a1+a2+a3+a4
进一步转化可以得到:
代码:
#include <iostream>
#include <string.h>
using namespace std;
#define N 15
#define mod 10000007 typedef long long LL; int n;
class Matrix{
public:
LL mat[N][N];
Matrix() {
for (int i = ; i < N; i++) {
memset(mat[i], , sizeof(mat[i]));
}
}
Matrix operator*(Matrix b){
Matrix temp;
for (int i = ; i <= n + ; i++){
for (int j = ; j <= n + ; j++){
for (int k = ; k <= n + ; k++){
if (mat[i][k] && b.mat[k][j]){
temp.mat[i][j] = (temp.mat[i][j] + (mat[i][k] % mod * b.mat[k][j] % mod) % mod) % mod;
}
}
}
}
return temp;
}
}; void MatrixMulti(Matrix &M,int m){
Matrix ans;
for (int i = ; i <= n + ; i++)
ans.mat[i][i] = ;
while (m){
if (m & )
ans = ans * M;
m >>= ;
M = M * M;
}
M = ans;
}
Matrix initialize(){
Matrix M;
for (int i = ; i <= n; i++) {
for (int j = ; j <= n + ; j++) {
if (j == )M.mat[i][j] = ;
else if (i >= j)M.mat[i][j] = ;
else if (j == n + )M.mat[i][j] = ;
else M.mat[i][j] = ;
}
}
M.mat[n + ][n + ] = ;
return M;
}
int main(){
int i, m;
while (~scanf("%d%d", &n, &m)){
int a[N];a[] = ;a[n + ] = ;
for (int i = ; i <= n; i++)
scanf("%d", &a[i]);
Matrix M = initialize();
MatrixMulti(M, m);
LL res = ;
for (i = ; i <= n + ; i++)
res = (res + (M.mat[n][i] % mod * a[i] % mod) % mod) % mod;
cout << res << endl;
}
return ;
}
本来是不想直接 mat[N] [N]这样直接开个大数组,时间空间上都浪费,但是这题用指针写起来真的很麻烦!!!而且不知道哪儿写错了,好一会儿我也找不到 -_-,就换成上面这个了。
#include <iostream>
#include <stdio.h>
using namespace std; typedef long long ll;
#define mod 10000007 int** initialize(int *A,int n) {
A[] = ;
for (int i = ; i <= n; i++) {
cin >> A[i];
}
A[n + ] = ;
int **M = new int*[n + ];
for (int i = ; i <= n + ; i++) {
M[i] = new int[n + ];
for (int j = ; j <= n + ; j++) {
if (j == )
M[i][j] = ;
else if (j <= i)M[i][j] = ;
else if (j == n + )M[i][j] = ;
else M[i][j] = ;
}
}
for (int i = ; i <= n + ; i++) {
if (i == n + )M[n + ][i] = ;
else M[n + ][i] = ;
}
return M;
}
void MatrixMulti(int **M1,int **M2,int n,int **M) {
int t[][] = { };
for (int i = ; i <= n + ; i++) {
for (int j = ; j <= n + ; j++) {
for (int k = ; k <= n + ; k++) {
t[i][j] = (t[i][j] + M1[i][k] % mod * M2[k][j] % mod) % mod;
}
}
}
for (int i = ; i <= n + ; i++) {
for (int j = ; j <= n + ; j++) {
M[i][j] = t[i][j];
}
} }
int **getBasicMatrix(int n) {
int **m = new int*[n + ];
for (int i = ; i <= n + ; i++) {
m[i] = new int[n + ];
for (int j = ; j <= n + ; j++) {
if (i == j)m[i][j] = ;
else m[i][j] = ;
}
}
return m;
}
int** MatrixQuickPower(int **M, int n, int m) {
int **res = getBasicMatrix(n);
while (m) {
if (m & )
MatrixMulti(res, M, n, res);
MatrixMulti(M, M, n, M);
m >>= ;
}
return res;
}
int main() {
int n, m;
while (~scanf("%d%d", &n, &m)) {
int res = ;
int *A = new int[n + ];
int **M = initialize(A, n);
M = MatrixQuickPower(M, n, m);
for (int i = ; i <= n + ; i++) {
res = (res + M[n][i] % mod * A[i] % mod) % mod;
}
cout << res << endl;
}
return ;
}