Practical very large CRFs

Paper writeup in progress by Francis Keith

Citation

Lavergne, T., O. Cappé, and F. Yvon. Practical very large scale CRFs. ACL-2010.

Online Version

An online version of the paper is available here [1]

Summary

The goal of this paper is to show challenges and results when trying to use Conditional Random Fields with a very large number of features. They detail and compare the 3 methods for computing the ${\displaystyle \ell ^{1}}$ penalty, as the sparsity introduced by the ${\displaystyle \ell ^{1}}$ penalty makes the model significantly more compact.

The methods they compare are:

• Quasi Newton
• Stochastic Gradient Descent
• Block Coordinate Descent

Implementation Issues with Large Scale CRFs

The paper goes into detail about a few issues with implementing CRFs on a large scale:

• As a generally accepted practice when using the Forward-Backward algorithm or any large probabilistic chain, people tend to work in the log-domain to guarantee avoidance of over/underflow. This causes a massive slowdown due to repeated calls to ${\displaystyle \operatorname {exp} }$ and ${\displaystyle \operatorname {log} }$. They work around this by normalizing ${\displaystyle \alpha }$ and ${\displaystyle \beta }$ calls, and vectorizing ${\displaystyle \operatorname {exp} }$ calls.
• Computing the gradient often requires the most computation time. They resolve this by doing a few things:
  • Using a sparse matrix M, the computation time becomes proportional to the average number of active features (as opposed to being proportional to all possible features)
  • Parallelizing Forward-Backward
  • In addition, Block Coordinate Descent also has the property of being able to truncate forward and backward probabilities after a certain point, which speeds up the running of this immensely.
• For large scale feature vectors (of size ${\displaystyle K}$, which could be billions), memory begins to become an issue
  • Block Coordinate Descent only requires a single vector of size ${\displaystyle K}$
  • Stochastic Gradient Descent requires 2 vectors of size ${\displaystyle K}$
  • Quasi Newton is implementation specific, but the authors' implementation required on the order of 12 vectors of size ${\displaystyle K}$