• 【POJ】3150 Cellular Automaton(矩阵乘法+特殊的技巧)


    http://poj.org/problem?id=3150

    这题裸的矩阵很容易看出,假设d=1,n=5那么矩阵是这样的

    1 1 0 0 1

    1 1 1 0 0

    0 1 1 1 0

    0 0 1 1 1

    1 0 0 1 1

    这是n^3的,可是n<=500,显然tle

    我们观察这个n×n的矩阵,发现没一行都是由上一行向右移得到的。

    而根据Cij=Aik×Bkj,我们可以发现,其实Bkj==Akj==Ai(j-k)

    那么就可以降二维变一维,每一次只要算第一行即可,即Cj=Ak*Bj-k

    #include <cstdio>
    #include <cstring>
    #include <cmath>
    #include <string>
    #include <iostream>
    #include <algorithm>
    using namespace std;
    #define rep(i, n) for(int i=0; i<(n); ++i)
    #define for1(i,a,n) for(int i=(a);i<=(n);++i)
    #define for2(i,a,n) for(int i=(a);i<(n);++i)
    #define for3(i,a,n) for(int i=(a);i>=(n);--i)
    #define for4(i,a,n) for(int i=(a);i>(n);--i)
    #define CC(i,a) memset(i,a,sizeof(i))
    #define read(a) a=getint()
    #define print(a) printf("%d", a)
    #define dbg(x) cout << #x << " = " << x << endl
    #define printarr(a, n, m) rep(aaa, n) { rep(bbb, m) cout << a[aaa][bbb]; cout << endl; }
    inline const long long getint() { long long r=0, k=1; char c=getchar(); for(; c<'0'||c>'9'; c=getchar()) if(c=='-') k=-1; for(; c>='0'&&c<='9'; c=getchar()) r=r*10+c-'0'; return k*r; }
    inline const int max(const int &a, const int &b) { return a>b?a:b; }
    inline const int min(const int &a, const int &b) { return a<b?a:b; }
    typedef long long matrix[505];
    void mul(matrix a, matrix b, matrix c, int lb, int lc, long long md) {
    	matrix t;
    	rep(j, lc) {
    		t[j]=0;
    		rep(k, lb)
    			if(j-k>=0) t[j]=(t[j]+a[k]*b[j-k])%md;
    			else t[j]=(t[j]+a[k]*b[lb+j-k])%md;
    	}
    	rep(j, lc) c[j]=t[j];
    }
    matrix a, b, c;
    int main() {
    	long long n, m, d, k;
    	cin >> n >> m >> d >> k;
    	rep(i, n) read(c[i]);
    	a[0]=b[0]=1;
    	rep(j, d+1) a[j]=1;
    	for2(j, n-d, n) a[j]=1;
    	while(k) {
    		if(k&1) mul(a, b, b, n, n, m);
    		mul(a, a, a, n, n, m);
    		k>>=1;
    	}
    	mul(c, b, c, n, n, m);
    	rep(i, n) printf("%lld ", c[i]);
    	return 0;
    }
    

    Description

    A cellular automaton is a collection of cells on a grid of specified shape that evolves through a number of discrete time steps according to a set of rules that describe the new state of a cell based on the states of neighboring cells. The order of the cellular automaton is the number of cells it contains. Cells of the automaton of order n are numbered from 1 to n.

    The order of the cell is the number of different values it may contain. Usually, values of a cell of order m are considered to be integer numbers from 0 to m − 1.

    One of the most fundamental properties of a cellular automaton is the type of grid on which it is computed. In this problem we examine the special kind of cellular automaton — circular cellular automaton of order n with cells of order m. We will denote such kind of cellular automaton as n,m-automaton.

    A distance between cells i and j in n,m-automaton is defined as min(|ij|, n − |ij|). A d-environment of a cell is the set of cells at a distance not greater than d.

    On each d-step values of all cells are simultaneously replaced by new values. The new value of cell i after d-step is computed as a sum of values of cells belonging to the d-enviroment of the cell i modulo m.

    The following picture shows 1-step of the 5,3-automaton.

    The problem is to calculate the state of the n,m-automaton after k d-steps.

    Input

    The first line of the input file contains four integer numbers n, m, d, and k (1 ≤ n ≤ 500, 1 ≤ m ≤ 1 000 000, 0 ≤ d < n2 , 1 ≤ k ≤ 10 000 000). The second line contains n integer numbers from 0 to m − 1 — initial values of the automaton’s cells.

    Output

    Output the values of the n,m-automaton’s cells after k d-steps.

    Sample Input

    sample input #1
    5 3 1 1
    1 2 2 1 2
    
    sample input #2
    5 3 1 10
    1 2 2 1 2

    Sample Output

    sample output #1
    2 2 2 2 1
    
    sample output #2
    2 0 0 2 2

    Source

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  • 原文地址:https://www.cnblogs.com/iwtwiioi/p/3946211.html
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