动态规划之矩阵连乘问题Python实现方法

# coding=gbk# 矩阵连乘问题__author__ = 'ice'# row_num 每个矩阵的行数class Matrix:  def __init__(self, row_num=0, col_num=0, matrix=None):    if matrix != None:      self.row_num = len(matrix)      self.col_num = len(matrix[0])    else:      self.row_num = row_num      self.col_num = col_num    self.matrix = matrixdef matrix_chain(matrixs):  matrix_num = len(matrixs)  count = [[0 for j in range(matrix_num)] for i in range(matrix_num)]  flag = [[0 for j in range(matrix_num)] for i in range(matrix_num)]  for interval in range(1, matrix_num + 1):    for i in range(matrix_num - interval):      j = i + interval      count[i][j] = count[i][i] + count[i + 1][j] + matrixs[i].row_num * matrixs[i + 1].row_num * matrixs[j].col_num      flag[i][j] = i      for k in range(i + 1, j):        temp = count[i][k] + count[k + 1][j] + matrixs[i].row_num * matrixs[k + 1].row_num * matrixs[j].col_num        if temp < count[i][j]:          count[i][j] = temp          flag[i][j] = k  traceback(0, matrix_num - 1, flag)  return count[0][matrix_num - 1]def traceback(i, j, flag):  if i == j:    return  if j - i > 1:    print(str(i + 1) + '~' + str(j + 1), end=': ')    print(str(i + 1) + ":" + str(flag[i][j] + 1), end=',')    print(str(flag[i][j] + 2) + ":" + str(j + 1))  traceback(i, flag[i][j], flag)  traceback(flag[i][j] + 1, j, flag)matrixs = [Matrix(30, 35), Matrix(35, 15), Matrix(15, 5), Matrix(5, 10), Matrix(10, 20), Matrix(20, 25)]result = matrix_chain(matrixs)print(result)# 1~6: 1:3,4:6# 1~3: 1:1,2:3# 4~6: 4:5,6:6# 15125