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\chapter{Posterior Regularization}
Posterior regularization is an alternative way of clustering the phrases.
Unlike a Bayesian approach where intuitions about the data are
expressed through the priors,
posterior regularization imposes constraints
on posterior distributions of the data.
In this chapter , we will introduce a basic clustering model with EM
and look at shortcomings of the basic model. This will motivate us for
more complicated posterior regularized models.
\section{Phrase Clustering Model}
As a brief recap, the clustering problem we are working with
is to label phrases with $K$ induced categories, where
$K$ is picked manually.
Phrases are obtained from bi-text data.
We also look at context
words before and after
phrases as cues for clustering.
The relationship between phrases, contexts and categories are
represented with a generative model shown in
Figure \ref{fig:EM}: a phrase picks a
category and then that category generates the contex for the phrase.
\begin{figure}[h]
\centering
\includegraphics[width=3.0in]{pr-clustering/EMdigram}
\caption{Basic Phrase Clustering Model}
\label{fig:EM}
\end{figure}
The joint probability of a category $z$ and a context $\textbf{c}$
given a phrase $\textbf{p}$ is
\begin{equation}\label{eq:NBPost}
P(z,\textbf{c}|\textbf{p})=P(z|\textbf{p})P(\textbf{c}|z).
\end{equation}
$P(z|\textbf{p})$ is distribution of categories given a phrase.
This can be learned from data.
$P(\textbf{c}|z)$ is distribution of context given a category.
Since a context usually contains multiple slots for words, we further
decompose this distribution into independent distributions at
each slot. For example, suppose a context consists of two positions
before and after the phrase. Denote these words as
$c_{-2},c_{-1},c_1,c_2$.
Use $P_{-2},P_{-1},P_1,P_2$ to denote distributions of words at each
position, $P(\textbf{c}|z)$ is decomposed as
\[
P(\textbf{c}|z)=P_{-2}(c_{-2}|z)P_{-1}
(c_{-1}|z)P_1(c_1|z)P_2(c_2|z).
\]
The posterior probability of a category given a phrase
and a context can be computed by normalizing the joint probability:
\[
P(z|\textbf{p},\textbf{c})=\frac{P(z,\textbf{c}|\textbf{p})}
{\sum_{i=1,K}P(i,\textbf{c}|\textbf{p})}.
\]
With the mechanisms to compute the posterior probabilities, we can
apply expectation-maximization algorithm (EM)
to learn all the probabilities.
EM algorithm maximizes the data likelihood
\[
\mathcal{L}=
\sum_{\textbf{p},\textbf{c}}
\log \sum_{z=1}^K P(z,\textbf{c}|\textbf{p})
\]
EM works by iterating between two steps:
E step computes posterior
distributions according to Equation \ref{eq:NBPost},
M step updates model parameters with maximum likelihood
estimation as in Equation \ref{eq:MStep}.
\begin{equation}\label{eq:MStep}
\boldsymbol{\theta}=
\arg\max_{\boldsymbol{\theta}}
\sum_{\textbf{c},\textbf{p}}\sum_z
P(z|\textbf{p},\textbf{c},
\boldsymbol\theta^{old})\log
P(\textbf{c},\textbf{p}|z,\boldsymbol{\theta}).
\end{equation}
\section{Sparsity Constraints}\label{sec:pr-sparse}
A common linguistic intuition we have about the phrase
clustering problem is that a phrase should be put into very
few categories, e.g. a verb phrase is unlikely to be used as
a noun phrase. In other words, the categorization of
a phrase should be sparse.
The generative model we proposed above with EM
allows a phrase to be labelled with many tags. As we observed
from the output, EM is using more categories than we wanted for
each phrase.
Posterior regularization
provides a way to enforce sparsity \citep{ganchev:penn:2009}.
The general idea of posterior regularization is to modify
E-step of EM, so that instead of using posterior distribution
as the $q$ distribution directly, the nearest
$q$
in a constrained space is used
as shown in Figure \ref{fig:EMPR}.
\begin{figure}[h]
\centering
\includegraphics[width=3.5in]{pr-clustering/EMPR}
\caption{EM with posterior regularization}
\label{fig:EMPR}
\end{figure}
The constraint we use here is called $L_1/ L_\infty$
regularization in Ganchev's technical report. The notations
we use here largely follows Ganchev's.
In a more mathematical formulation, for each phrase $\textbf{p}$,
we want the quantity
\begin{equation}\label{eq:sparsity}
\sum_{z=1}^K \max_i P(z|\textbf{p},\textbf{c}_i)
\end{equation}
to be small, where $\textbf{c}_i$ is the context
appeared around the $i$th occurrence of phrase $\textbf{p}$
throughout the data. This quantity roughly equals
the number of categories phrase $\textbf{p}$ uses.
It is minimized to $1$ if and only if
the posterior distributions $P(z|\textbf{p},\textbf{c}_i)$
are the same
for all
occurrences of $\textbf{p}$. That is ,
$\forall i,j$,
$P(z|\textbf{p},\textbf{c}_i)=P(z|\textbf{p},\textbf{c}_j)$.
For example, Table \ref{tab:sparse} compares two $L_1/L_{\infty}$
norms of phrases. The first phrase prefers multiple categories
under different contexts, the second phrase prefers
the same category under all contexts. The second phrase
has a much smaller $L_1/L_{\infty}$ norm.
\begin{table}[h]
\label{tab:sparse}
\centering
\includegraphics[width=3.5in]{pr-clustering/sparse0}
\caption{$L_1/L_{\infty}$ norm of a phrase
that prefers multiple categories}
\includegraphics[width=3.5in]{pr-clustering/sparse1}
\caption{$L_1/L_{\infty}$ norm of a phrase
that prefers a single phrase}
\end{table}
Define feature functions for $i$th occurrence of phrase $\textbf{p}$
with category $j$,
as a function of category $z$:
\[
\phi_{\textbf{p}ij}(z)=
\begin{cases}
1\text{ if z=j}\\
0\text{ otherwise}
\end{cases}.
\]
For notation simplicity, for
each phrase category pair,
define variables
$e_{\textbf{p}z}$ to be
$\max_i E_q[\phi_{\textbf{p}iz}]$. Note this is just
a different notation for the term in
Expression \ref{eq:sparsity}.
The objective we want to optimize becomes:
\[
\arg\min_{q,c_{\textbf{p}z}} KL(q||P_{\theta}) +
\sigma \sum_{\textbf{p},z}e_{\textbf{p}z}
\]
\[
\text{ s.t. }\forall \textbf{p},z,
E_q[\phi_{\textbf{p}iz}]\leq e_{\textbf{p}z},
\]
where $\sigma$ is a constant to control
how strongly the soft constraint should
be enforced.
Using Lagrange Multipliers, this objective can
be optimized in its dual form,
for each phrase $\textbf{p}$:
\[
\arg\min_{\lambda\geq 0} \log
(\sum_{z,i} P_\theta(z|\textbf{p},\textbf{c}_i)
\exp (-\lambda_{\textbf{p}iz}))
\]
\[
\text{ s.t. } \forall \textbf{p},z,
\sum_i \lambda_{\textbf{p}iz}\leq \sigma.
\]
This dual objective can be optimized with projected gradient
descent.
The $q$ distribution we are looking for is then
\[
q_i(z)\propto P_{\theta}(z|\textbf{p},\textbf{c}_i)
\exp(\lambda_{\textbf{p}iz}).
\]
M-step can be performed as usual by replacing
$P(z|\textbf{p},\textbf{c},
\boldsymbol\theta^{old})$ with
$q(z)$ in Equation \ref{eq:MStep}.
\section{Agreement Models}\label{sec:pr-agree}
Another type of constraint we used is agreement between
different models. The intuition is that if two models run
on the same dataset, it is desirable for them to give the same
output. Suppose two models gives two posterior
distributions of categories
$P_{\theta_1}(z|\textbf{p},\textbf{c})$,
$P_{\theta_2}(z|\textbf{p},\textbf{c})$. The
agreement constraint seeks posterior distributions
$q_1(z),q_2(z)$
such that $q_1(z)=q_2(z)$ while minimizing
the KL-divergence
$KL(q(z_1)q(z_2)||
P_{\theta_1}(z|\textbf{p},\textbf{c})
P_{\theta_1}(z|\textbf{p},\textbf{c}))$.
The solution to $q_1,q_2$ has a simple closed
form derived from Lagrange Multipliers shown in
Equation \ref{eq:AgreePost}.
\begin{equation}\label{eq:AgreePost}
q_1(z)=q_2(z)\propto
\sqrt{P_{\theta_1}(z|\textbf{p},\textbf{c})
P_{\theta_1}(z|\textbf{p},\textbf{c})}
\end{equation}.
Since there is no reason to believe in that
phrases generates a category and then generate
a context, it is very natural to come up with a model
that generates in the reverse direction
as shown in Figure \ref{fig:EMreverse}. This model
and the original model should then follow the agreement
constraint.
We also
took advantage of bi-text data and make models
learning from different languages to
agree with each other.
\begin{figure}[h]
\centering
\includegraphics[width=3.0in]{pr-clustering/EMreverse}
\caption{Generative Model in the reverse Direction}
\label{fig:EMreverse}
\end{figure}
In the reversed model,
the posterior probability of the labelling of
a context $\textbf{c}$ with
phrase $\textbf{p}$ is
\[
P(z|\textbf{c},\textbf{p})\propto
P(z|\textbf{c})P(\textbf{p}|z).
\]
Since a phrase contains a variable number of words,
we only look at the first and last word of
a phrase. That is $P(\textbf{p}|z)=P_l(p_l|z)P_r(p_r|z)$,
where $P_l$ and $P_r$
denotes distributions for words in the first and last position
, $p_l$ and $p_r$ are words in the first and last position.
The implementation of agreement models again ends up making
a small change to E-step. The $q$ distribution for
a phrase $\textbf{p}$ and a context $\textbf{c}$
is given by Equation \ref{eq:AgreePost}.
In M-step, both models should update their parameters with $q$ distribution computed as above.
This modified EM is proven to
maximizes the objective:
\[
\mathcal{L}_1+
\mathcal{L}_2+
\sum_{\textbf{p},\textbf{c}}
\log\sum_z\sqrt{P_{\theta_1}(z|\textbf{p},\textbf{c})
P_{\theta_2}(z|\textbf{p},\textbf{c})},
\]
where $\mathcal{L}_1$ and $\mathcal{L}_2$
are log-likelihoods of
each individual model.
\section{Experiments}
As a sanity check, we looked at a few examples produced by
the basic model (EM)
and the posterior regularization (PR) model
with sparsity constraints. Table \ref{tab:EMVSPR}
shows a few examples.
\begin{table}[h]
\centering
\includegraphics[width=3.5in]{pr-clustering/EMVSPR}
\caption[A few examples comparing EM and PR]
{A few examples comparing EM and PR.
Count of most frequent category shows how
many instances of a phrase are concentrated on
the single most frequent tag.
Number of categories shows how many categories
a phrase is labelled with. By experience as mentioned before,
we want a phrase to use fewer categories.
These numbers are fair indicators of sparsity.
}
\label{tab:EMVSPR}
\end{table}
The models are formally evaluated with two kinds
of metrics. We feed the clustering output
through the whole translation pipeline
to obtain a BLEU score. We also came up
with an intrinsic evaluation of clustering quality
by comparing against a supervised CFG parser trained on the
tree bank.
We are mainly working on Urdu-English language pair.
Urdu has very
different word ordering from English.
This leaves us room for improvement over
phrase-based systems.
Here in Table \ref{tab:results}
we show BLEU scores as well as
conditional entropy for each of the models above
on Urdu data. Conditional entropy is computed
as the entropy of ``gold'' labelling given
the predicted clustering. ``Gold'' labelling
distribution
is obtained from Collins parser
trained on Penn Treebank. Since not
all phrases are constituents, we ignored
phrases that don't correspond any constituents.
\begin{table}[h]
\centering
\begin{tabular}{ |*{3}{c|} }
\hline
model & BLEU & H(Gold$|$Predicted)\\
\hline
hiero & 21.1 & 5.77\\
hiero+POS & 22.3 & 1.00 \\
SAMT & 24.5 & 0.00 \\
\hline
EM & 20.9 & 2.86 \\
PR $\sigma=100$ & 21.7 & 2.36 \\
agree language & 21.7 & 2.68 \\
agree direction & 22.1 & 2.35\\
non-parametric & 22.2 & ?\\
\hline
\end{tabular}
\caption
{Evaluation of PR models.
Left column shows BLEU scores
through the translation pipeline.
Right columns shows conditional entropy
of the
}
\label{tab:results}
\end{table}
In Table \ref{tab:results}, the first three rows
are baseline system. The rest are developed in the workshop.
Hiero is hierachical phrase-based
model with 1 category in all of its SCFG rules. Hiero+POS
is hiero with all words labelled with their POS tags.
SAMT is a syntax based system with a supervised
parser trained on Treebank. EM is the first model mentioned
in the beginning of this chapter. PR $\sigma=100$ is
posterior regularization model with sparsity constraint
explained in Section \ref{sec:pr-sparse}.
$\sigma$ is the constant controls strongness of the constraint.
Agree language and agree direction are models with agreement
constraints mentioned in Section \ref{sec:pr-agree}. Non-parametric
is non-parametric model introduced in the previous chapter.
\section{Conclusion}
|