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本文实例讲述了Python基于聚类算法实现密度聚类(DBSCAN)计算。分享给大家供大家参考,具体如下:
创新互联专注于十堰郧阳网站建设服务及定制,我们拥有丰富的企业做网站经验。 热诚为您提供十堰郧阳营销型网站建设,十堰郧阳网站制作、十堰郧阳网页设计、十堰郧阳网站官网定制、微信小程序开发服务,打造十堰郧阳网络公司原创品牌,更为您提供十堰郧阳网站排名全网营销落地服务。算法思想
基于密度的聚类算法从样本密度的角度考察样本之间的可连接性,并基于可连接样本不断扩展聚类簇得到最终结果。
几个必要概念:
ε-邻域:对于样本集中的xj, 它的ε-邻域为样本集中与它距离小于ε的样本所构成的集合。
核心对象:若xj的ε-邻域中至少包含MinPts个样本,则xj为一个核心对象。
密度直达:若xj位于xi的ε-邻域中,且xi为核心对象,则xj由xi密度直达。
密度可达:若样本序列p1, p2, ……, pn。pi+1由pi密度直达,则p1由pn密度可达。
大致思想如下:
1. 初始化核心对象集合T为空,遍历一遍样本集D中所有的样本,计算每个样本点的ε-邻域中包含样本的个数,如果个数大于等于MinPts,则将该样本点加入到核心对象集合中。初始化聚类簇数k = 0, 初始化未访问样本集和为P = D。
2. 当T集合中存在样本时执行如下步骤:
Q = Q+S, P = P-S
3. 划分为C= {C1, C2, ……, Ck}
Python代码实现
#-*- coding:utf-8 -*- import math import numpy as np import pylab as pl #数据集:每三个是一组分别是西瓜的编号,密度,含糖量 data = """ 1,0.697,0.46,2,0.774,0.376,3,0.634,0.264,4,0.608,0.318,5,0.556,0.215, 6,0.403,0.237,7,0.481,0.149,8,0.437,0.211,9,0.666,0.091,10,0.243,0.267, 11,0.245,0.057,12,0.343,0.099,13,0.639,0.161,14,0.657,0.198,15,0.36,0.37, 16,0.593,0.042,17,0.719,0.103,18,0.359,0.188,19,0.339,0.241,20,0.282,0.257, 21,0.748,0.232,22,0.714,0.346,23,0.483,0.312,24,0.478,0.437,25,0.525,0.369, 26,0.751,0.489,27,0.532,0.472,28,0.473,0.376,29,0.725,0.445,30,0.446,0.459""" #数据处理 dataset是30个样本(密度,含糖量)的列表 a = data.split(',') dataset = [(float(a[i]), float(a[i+1])) for i in range(1, len(a)-1, 3)] #计算欧几里得距离,a,b分别为两个元组 def dist(a, b): return math.sqrt(math.pow(a[0]-b[0], 2)+math.pow(a[1]-b[1], 2)) #算法模型 def DBSCAN(D, e, Minpts): #初始化核心对象集合T,聚类个数k,聚类集合C, 未访问集合P, T = set(); k = 0; C = []; P = set(D) for d in D: if len([ i for i in D if dist(d, i) <= e]) >= Minpts: T.add(d) #开始聚类 while len(T): P_old = P o = list(T)[np.random.randint(0, len(T))] P = P - set(o) Q = []; Q.append(o) while len(Q): q = Q[0] Nq = [i for i in D if dist(q, i) <= e] if len(Nq) >= Minpts: S = P & set(Nq) Q += (list(S)) P = P - S Q.remove(q) k += 1 Ck = list(P_old - P) T = T - set(Ck) C.append(Ck) return C #画图 def draw(C): colValue = ['r', 'y', 'g', 'b', 'c', 'k', 'm'] for i in range(len(C)): coo_X = [] #x坐标列表 coo_Y = [] #y坐标列表 for j in range(len(C[i])): coo_X.append(C[i][j][0]) coo_Y.append(C[i][j][1]) pl.scatter(coo_X, coo_Y, marker='x', color=colValue[i%len(colValue)], label=i) pl.legend(loc='upper right') pl.show() C = DBSCAN(dataset, 0.11, 5) draw(C)