• HDU 2254 奥运(矩阵高速幂+二分等比序列求和)


    HDU 2254 奥运(矩阵高速幂+二分等比序列求和)

    ACM

    题目地址:HDU 2254 奥运

    题意: 
    中问题不解释。

    分析: 
    依据floyd的算法,矩阵的k次方表示这个矩阵走了k步。 
    所以k天后就算矩阵的k次方。 
    这样就变成:初始矩阵的^[t1,t2]这个区间内的v[v1][v2]的和。 
    所以就是二分等比序列求和上场的时候了。

     
    HDU 1588 Gauss Fibonacci的算法一样。

    代码

    /*
    *  Author:      illuz <iilluzen[at]gmail.com>
    *  Blog:        http://blog.csdn.net/hcbbt
    *  File:        2254.cpp
    *  Create Date: 2014-08-04 10:52:29
    *  Descripton:  matrix, floyd
    */
    
    #include <cstdio>
    #include <cstring>
    #include <iostream>
    #include <map>
    #include <algorithm>
    using namespace std;
    #define repf(i,a,b) for(int i=(a);i<=(b);i++)
    typedef long long ll;
    
    const int N = 20;
    const int SIZE = 32;        // max size of the matrix
    const int MOD = 2008;
    
    int n, k, p1, p2;
    ll v1, v2, t1, t2;
    map<int, int> mp;
    
    struct Mat{
        int n;
        ll v[SIZE][SIZE];    // value of matrix
    
        Mat(int _n = SIZE) {
            n = _n;
        }
    
        void init(ll _v = 0) {
            memset(v, 0, sizeof(v));
            if (_v)
                repf (i, 0, n - 1)
                    v[i][i] = _v;
        }
    
        void output() {
            repf (i, 0, n - 1) {
                repf (j, 0, n - 1)
                    printf("%lld ", v[i][j]);
                puts("");
            }
            puts("");
        }
    } a, b;
    
    Mat operator * (Mat a, Mat b) {
        Mat c(a.n);
        repf (i, 0, a.n - 1) {
            repf (j, 0, a.n - 1) {
                c.v[i][j] = 0;
                repf (k, 0, a.n - 1) {
                    c.v[i][j] += (a.v[i][k] * b.v[k][j]) % MOD;
                    c.v[i][j] %= MOD;
                }
            }
        }
        return c;
    }
    
    Mat operator ^ (Mat a, ll k) {
        Mat c(a.n);
        c.init(1);
        while (k) {
            if (k&1) c = a * c;
            a = a * a;
            k >>= 1;
        }
        return c;
    }
    
    Mat operator + (Mat a, Mat b) {
        Mat c(a.n);
        repf (i, 0, a.n - 1)
            repf (j, 0, a.n - 1)
                c.v[i][j] = (b.v[i][j] + a.v[i][j]) % MOD;
        return c;
    }
    
    Mat operator + (Mat a, ll b) {
        Mat c = a;
        repf (i, 0, a.n - 1)
            c.v[i][i] = (a.v[i][i] + b) % MOD;
        return c;
    }
    
    Mat calc(Mat a, int n) {
        if (n == 1)
            return a;
        if (n&1)
            return (a^n) + calc(a, n - 1);
        else
            return calc(a, n/2) * ((a^(n/2)) + 1);
    }
    
    int main() {
        while (~scanf("%d", &n)) {
            a.init();
            mp.clear();
            int cnt = 0;
            while (n--) {
                scanf("%d%d", &p1, &p2);
                if (mp.find(p1) == mp.end())
                    p1 = mp[p1] = cnt++;
                else
                    p1 = mp[p1];
                if (mp.find(p2) == mp.end())
                    p2 = mp[p2] = cnt++;
                else
                    p2 = mp[p2];
                a.v[p1][p2]++;
            }
            a.n = cnt;
    
            scanf("%d", &k);
            while (k--) {
                scanf("%lld%lld%lld%lld", &v1, &v2, &t1, &t2);
                if (mp.find(v1) == mp.end() || mp.find(v2) == mp.end()) {
                    puts("0");
                    continue;
                }
                v1 = mp[v1];
                v2 = mp[v2];
                if (t1 > t2)
                    swap(t1, t2);
                if (t1 == 0) {
                    if (t2 == 0)
                        puts("0");
                    else
                        printf("%lld
    ", calc(a, t2).v[v1][v2]);
                }
                else if (t1 == 1)
                    printf("%lld
    ", calc(a, t2).v[v1][v2]);
                else {
                    printf("%lld
    ", ((calc(a, t2).v[v1][v2] - calc(a, t1 - 1).v[v1][v2]) + MOD) % MOD);
                }
            }
        }
        return 0;
    }


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  • 原文地址:https://www.cnblogs.com/liguangsunls/p/7299280.html
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