可达矩阵-邻接矩阵-以及有向图的python绘制-CSDN博客
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参考1
自定义输入矩阵来绘制
根据参考代码
自定义
代码如下
# 编程实现有向图连通性的判断
from pylab import mpl
mpl.rcParams['font.sans-serif'] = ['SimHei']
mpl.rcParams['axes.unicode_minus'] = False
import numpy as np
import networkx as nx
import matplotlib.pyplot as plt
import pylab
#定义x三阶矩阵
x = np.array([[1, 0, 0], [1, 1, 0], [1, 1, 1]])
#随机生成x为五阶矩阵
# x = np.random.randint(0, 2, (5, 5))
n = len(x)
value_1 = value_2 = sum_1 = sum_2 = sum_3 = sum_4 = y = final = x
y = x + x.T
# 计算可达矩阵
for i in range(1, n):
value_1 = np.matmul(value_1, x)
sum_1 = sum_1 + value_1
sum_2 = sum_1 + np.identity(n)
reachability_matrix = sum_2 > 0.5
print("此有向图的可达矩阵为")
print(reachability_matrix.astype(int))
final = reachability_matrix + reachability_matrix.T
for i in range(1, n):
value_2 = np.matmul(value_2, y)
sum_3 = sum_3 + value_2
sum_4 = sum_3 + np.identity(n)
reachability_matrix_1 = sum_4 > 0.5
# 给出判断结果
if ((reachability_matrix.astype(int) == np.ones((n, n)).astype(int)).all()):
print("此有向线图G为强连通图或其为无向连通图")
elif ((final.astype(int) == np.ones((n, n)).astype(int)).all()):
print("此有向线图G是单向连通图")
elif ((reachability_matrix_1.astype(int) == np.ones((n, n)).astype(int)).all()):
print("此有向线图G是弱连通图")
else:
print("此有向图不连通")
# 下面展示图形化输出有向图G
G = nx.DiGraph()
for i in range(0, n):
j=i+1
G.add_node(i, desc='p' + str(j))
for p in range(0, n):
for q in range(0, n):
if x[p, q] == 1:
G.add_edges_from([(p, q)], weight='1')
edge_labels = dict([((u, v), d['weight']) for u, v, d in G.edges(data=True)])
edge_colors = ['black']
pos = nx.spring_layout(G)
node_labels = nx.get_node_attributes(G, 'desc')
nx.draw_networkx_labels(G, pos, labels=node_labels)
nx.draw_networkx_edge_labels(G, pos, edge_labels=edge_labels)
nx.draw(G, pos, node_size=1500, edge_color=edge_colors, edge_cmap=plt.cm.Reds)
plt.title('Directed Graph', fontsize=10)
pylab.show()
第二版
增大了字体
可以自定义字体大小
# 编程实现有向图连通性的判断
from pylab import mpl
mpl.rcParams['font.sans-serif'] = ['SimHei']
mpl.rcParams['axes.unicode_minus'] = False
import numpy as np
import networkx as nx
import matplotlib.pyplot as plt
import pylab
#定义x三阶矩阵
x = np.array([[1, 0, 0], [1, 1, 0], [1, 1, 1]])
#随机生成x为五阶矩阵
# x = np.random.randint(0, 2, (5, 5))
n = len(x)
value_1 = value_2 = sum_1 = sum_2 = sum_3 = sum_4 = y = final = x
y = x + x.T
# 计算可达矩阵
for i in range(1, n):
value_1 = np.matmul(value_1, x)
sum_1 = sum_1 + value_1
sum_2 = sum_1 + np.identity(n)
reachability_matrix = sum_2 > 0.5
print("此有向图的可达矩阵为")
print(reachability_matrix.astype(int))
final = reachability_matrix + reachability_matrix.T
for i in range(1, n):
value_2 = np.matmul(value_2, y)
sum_3 = sum_3 + value_2
sum_4 = sum_3 + np.identity(n)
reachability_matrix_1 = sum_4 > 0.5
# 给出判断结果
if ((reachability_matrix.astype(int) == np.ones((n, n)).astype(int)).all()):
print("此有向线图G为强连通图或其为无向连通图")
elif ((final.astype(int) == np.ones((n, n)).astype(int)).all()):
print("此有向线图G是单向连通图")
elif ((reachability_matrix_1.astype(int) == np.ones((n, n)).astype(int)).all()):
print("此有向线图G是弱连通图")
else:
print("此有向图不连通")
# 下面展示图形化输出有向图G
G = nx.DiGraph()
for i in range(0, n):
j = i + 1
G.add_node(i, desc='p' + str(j))
for p in range(0, n):
for q in range(0, n):
if x[p, q] == 1:
G.add_edges_from([(p, q)], weight='1')
edge_labels = dict([((u, v), d['weight']) for u, v, d in G.edges(data=True)])
edge_colors = ['black']
pos = nx.spring_layout(G)
node_labels = nx.get_node_attributes(G, 'desc')
nx.draw_networkx_labels(G, pos, labels=node_labels, font_size=16) # 设置字体大小为16
nx.draw_networkx_edge_labels(G, pos, edge_labels=edge_labels, font_size=12)
nx.draw(G, pos, node_size=1500, edge_color=edge_colors, edge_cmap=plt.cm.Reds)
plt.title('Directed Graph', fontsize=10)
pylab.show()
| 阿里云国内75折 回扣 微信号:monov8 |
| 阿里云国际,腾讯云国际,低至75折。AWS 93折 免费开户实名账号 代冲值 优惠多多 微信号:monov8 飞机:@monov6 |