最近,我使用numpy在Python上实现了针对LDA主题模型的Gibbs采样,并将来自站点的一些代码作为参考。在Gibbs采样的每次迭代中,我们删除一个(当前)单词,根据从LDA模型推断的后验条件概率分布对该单词的新主题进行采样,并更新单词主题计数,如下所示:
for m, doc in enumerate(docs): #m: doc id
for n, t in enumerate(doc): #n: id of word inside document, t: id of the word globally
# discount counts for word t with associated topic z
z = z_m_n[m][n]
n_m_z[m][z] -= 1
n_z_t[z, t] -= 1
n_z[z] -= 1
n_m[m] -= 1
# sample new topic for multinomial
p_z_left = (n_z_t[:, t] + beta) / (n_z + V * beta)
p_z_right = (n_m_z[m] + alpha) / ( n_m[m] + alpha * K)
p_z = p_z_left * p_z_right
p_z /= numpy.sum(p_z)
new_z = numpy.random.multinomial(1, p_z).argmax()
# set z as the new topic and increment counts
z_m_n[m][n] = new_z
n_m_z[m][new_z] += 1
n_z_t[new_z, t] += 1
n_z[new_z] += 1
n_m[m] += 1
在上面的代码中,我们使用多项scipy函数对一个新的(单个)z进行采样。
现在,我想实现this paper的联合情感主题模型。现在,我需要以下结构来跟踪所需的计数:
3D matrix containing # occurrences for a word for each topic, for each sentiment
3D matrix containing # occurrences for a topic, for each sentiment, for each document
2D matrix containing # occurrences for a topic, for each sentiment
2D matrix containing # occurrences for a sentiment for each document
现在问题出现了:在这个Gibbs采样器中,对于文档中看到的每个单词,新主题和情感标签现在都是从条件后验中采样的(本文第4页方程式5)。 我怎么能在Python中“对这两个值进行采样”呢?
提前致谢...
答案 0 :(得分:2)
试试这个。从主题和情感标签的联合分布中抽样只意味着整个T x S矩阵总和为1。
docs=[[0,1],[0,0],[1,0,1]]
D=len(docs)
z_d_n=[[0 for _ in xrange(len(d))] for d in docs]
l_d_n=[[0 for _ in xrange(len(d))] for d in docs]
V=2
T=2
S=2
n_m_j_k=numpy.zeros( (V,T,S) )
n_j_k_d=numpy.zeros( (T,S,D) )
n_j_k=numpy.zeros( (T,S) )
n_k_d=numpy.zeros( (S,D) )
n_d=numpy.zeros( (D) )
beta=.1
alpha=.1
gamma=.1
for d, doc in enumerate(docs): #d: doc id
for n, m in enumerate(doc): #i: index of the word inside document, m: id of the word in the vocabulary
# j is the topic
j = z_d_n[d][n]
# k is the sentiment
k = l_d_n[d][n]
n_m_j_k[m][j][k] += 1
n_j_k_d[j][k][d] += 1
n_j_k[j][k] += 1
n_k_d[k][d] += 1
n_d[d] += 1
for d, doc in enumerate(docs): #d: doc id
for n, m in enumerate(doc): #i: index of the word inside document, m: id of the word in the vocabulary
# j is the topic
j = z_d_n[d][n]
# k is the sentiment
k = l_d_n[d][n]
n_m_j_k[m][j][k] -= 1
n_j_k_d[j][k][d] -= 1
n_j_k[j][k] -= 1
n_k_d[k][d] -= 1
n_d[d] -= 1
# sample a new topic and sentiment label jointly
# T is the number of topics
# S is the number of sentiments
p_left = (n_m_j_k[m] + beta) / (n_j_k + V * beta) # T x S array
p_mid = (n_j_k_d[:,:,d] + alpha) / numpy.tile(n_k_d[:,d] + T * alpha, (T,1) )
p_right = numpy.tile(n_k_d[:,d] + gamma,(T,1)) / numpy.tile(n_d[d] + S * gamma,(T,S))
p = p_left * p_mid * p_right
p /= numpy.sum(p)
new_jk = numpy.random.multinomial(1, numpy.reshape(p, (T*S) )).argmax()
j=new_jk/T
k=new_jk%T
z_d_n[d][n]=j
l_d_n[d][n]=k
n_m_j_k[m][j][k] += 1
n_j_k[j][k] += 1
n_k_d[k][d] += 1
n_d[d] += 1