Difference between revisions of "Inside Outside algorithm"

This is a Method page for the Inside-outside algorithm.

Background

The inside-outside algorithm is a way of estimating probabilities in a PCFG. It is first introduced [| Baker, 1979]. The inside outside algorithm is in fact a generalization of the forward-backward algorithm (for hidden Markov models) to PCFGs.

It is often used as part of the EM algorithm for computing expectations.

Algorithm

The algorithm is a dynamic programming algorithm that is often used with chart parsers to estimate expected production counts. Here, we assume the grammar ${\displaystyle G}$ is of Chomsky Normal Form.

The algorithm works by computing 2 probabilities for each nonterminal ${\displaystyle A}$ and span ${\displaystyle i,j}$.

Inside probabilities

The inside probability is defined as ${\displaystyle \alpha (A,i,j)=P(A{\overset {*}{\Rightarrow }}w_{i}...w_{j}|G,\mathbf {w} )}$, which is the probability of a nonterminal ${\displaystyle A}$ generating the word sequence ${\displaystyle w_{i}}$ to ${\displaystyle w_{j}}$.

The inside probability can be calculated recursively with the following recurrence relation:

${\displaystyle \alpha (A,i,j)=\sum _{B,C}\sum _{i\leq k\leq j}p(A\rightarrow BC)\alpha (B,i,k)\alpha (C,k+1,j)}$

Intuitively, this can be seen as computing the sum over all possible ways of building trees rooted by ${\displaystyle A}$ and generating the word span ${\displaystyle i,j}$.

For the base case, it is simply ${\displaystyle \alpha (A,i,i)=p(A\rightarrow w_{i})}$.

Outside counts

The outside probability is defined as ${\displaystyle \beta (A,i,j)=P(S{\overset {*}{\Rightarrow }}w_{1},...,w_{i-1},A,w_{j+1},...,w_{n})}$, which is the probability of generating a parse tree spanning the entire sentence that uses nonterminal ${\displaystyle A}$ to span ${\displaystyle i,j}$.

The reccurrence relation is thus:

${\displaystyle \beta (A,i,j)=\sum _{B,C}\sum {1\leq k<i}p(B\rightarrow CA)\alpha (C,k,i-1)\beta (B,k,j)+\sum _{B,C}\sum _{j<k\leq n}p(B\rightarrow AC)\alpha (C,j+1,k)\beta (B,i,k)}$

The first term is the expected count of generating trees where ${\displaystyle A}$ is used as a right subtree, and the second term is that of ${\displaystyle A}$ being generated as a left subtree.

Dynamic programming: Putting them together