斐波那契的状态矩阵,求解时间复杂度O(logN)
由f(n) = f(n-1) + f(n-2),f(n-1) = f(n-1)
得(f(n),f(n-1)) =(f(n-1) + f(n-2),f(n-1))得到关于(f(n-1),f(n-2))系数行列式,自底向上推出方程即可
得到(f(n),f(n-1)) = (f(2),f(1)) *系数矩阵【【1,1】,【1,0】】n-2 可得
程序代码:
public class Fibonacci { //m*n 与 n*s 得到m*s public int[][] multiplyMatrix(int[][] m1, int[][] m2) { int[][] res = new int[m1.length][m2[0].length]; for (int i = 0; i < m1.length; i++) { for (int j = 0; j < m2[0].length; j++) { for (int k = 0; k < m2.length; k++) { res[i][j] += m1[i][k] * m2[k][j]; } } } return res; } //矩阵m的p次方 public int[][] matrixPower(int[][] m, int p) { int[][] res = new int[m.length][m[0].length]; //设置res为单位矩阵,任意矩阵乘以单位矩阵还是任意矩阵 for (int i = 0; i < res.length; i++) { res[i][i] = 1; } int[][] tmp = m; while (p > 0) { if ((p & 1) != 0) { res = multiplyMatrix(res, tmp); } tmp = multiplyMatrix(tmp, tmp); p >>= 1; } return res; } //O(logN)得到斐波那契值 public int f(int n) { if (n < 1) { return 0; } if (n == 1 || n == 2) { return 1; } int[][] base = {{1, 1}, {1, 0}}; int[][] res = matrixPower(base, n - 2); return res[0][0] + res[1][0]; } public static void main(String[] args) { Fibonacci fibonacci = new Fibonacci(); System.out.println(fibonacci.f(5)); } }
再举一个例子求解系数矩阵
递推公式:f(n) = f(n-1) + f(n-3)
列方程:
f(n) = 1*f(n-1) + 0*f(n-2) + 1*f(n-3)
f(n-1) = 1*f(n-1) + 0*f(n-2) + 0*f(n-3)
f(n-2) = 0*f(n-1) + 1*f(n-2) + 0*f(n-3)
得到(f(n),f(n-1),f(n-2)) 关于(f(n-1),f(n-2),f(n-3))的系数行列式:注意是一行乘以一列,等式右边系数按照列排列
1 1 0 0 0 1 1 0 0