Adafactor

Author: Aolei Cao (ac3237), Ziyang Li (zl986), Junjia Liang (jl4439) (ChemE 6800 Fall 2024)

Stewards: Nathan Preuss, Wei-Han Chen, Tianqi Xiao, Guoqing Hu

Introduction

Problem formulation

1. Objective

Minimize the loss function ${\displaystyle f(x)}$, where ${\displaystyle x\in R^{n}}$ and ${\displaystyle x}$ is the weight vector to be optimized.

2. Parameters

• Gradient:

${\displaystyle G_{t}=\nabla f(x_{t-1})}$

• Second moment estimate:

${\displaystyle {\hat {V}}_{t}={\hat {\beta }}_{2t}{\hat {V}}_{t-1}+(1-{\hat {\beta }}_{2t})(G_{t}^{2}+\epsilon _{1}1_{n})}$

• Where:
  • ${\displaystyle {\hat {V}}_{t}}$ is the running average of the squared gradient.
  • ${\displaystyle {\hat {\beta }}_{2t}}$ is the corrected decay parameter.
  • ${\displaystyle \epsilon _{1}}$ is a regularization constant.

• Step size:

${\displaystyle \alpha _{t}=\max(\epsilon _{2},{\text{RMS}}(x_{t-1}))\rho _{t}}$

• Where:
  • ${\displaystyle \rho _{t}}$ is the relative step size.
  • ${\displaystyle \epsilon _{2}}$ is a regularization constant.
  • ${\displaystyle {\text{RMS}}}$ is the root mean square, defined as:
    • ${\displaystyle u_{xt}={\frac {-g_{xt}}{\sqrt {{\hat {v}}_{xt}}}}}$
    • ${\displaystyle {\text{RMS}}(U_{t})={\text{RMS}}_{x\in X}(u_{xt})={\sqrt {{\text{Mean}}_{x\in X}\left({\frac {(g_{xt})^{2}}{{\hat {v}}_{xt}}}\right)}}}$

3. Algorithms

Adafactor for Weighted Vectors

Inputs:

• Initial point: ${\displaystyle X_{0}\in \mathbb {R} ^{n}}$
• Relative step sizes: ${\displaystyle \rho _{t}}$ for ${\displaystyle t=1}$ to ${\displaystyle T}$
• Second moment decay: ${\displaystyle {\hat {\beta }}_{2t}}$ for ${\displaystyle t=1}$ to ${\displaystyle T}$, with ${\displaystyle {\hat {\beta }}_{21}=0}$
• Regularization constants: ${\displaystyle \epsilon _{1},\epsilon _{2}}$
• Clipping threshold: ${\displaystyle d}$

Algorithm:

• For ${\displaystyle t=1}$ to ${\displaystyle T}$:
  • Compute adaptive step size: ${\displaystyle \alpha _{t}=\max(\epsilon _{2},{\text{RMS}}(X_{t-1}))\rho _{t}}$
  • Compute gradient: ${\displaystyle G_{t}=\nabla f_{t}(X_{t-1})}$
  • Update second moment estimate: ${\displaystyle {\hat {V}}_{t}={\hat {\beta }}_{2t}{\hat {V}}_{t-1}+(1-{\hat {\beta }}_{2t})(G_{t}^{2}+\epsilon _{1}1_{n})}$
  • Compute normalized gradient: ${\displaystyle U_{t}={\frac {G_{t}}{\sqrt {{\hat {V}}_{t}}}}}$
  • Apply clipping: ${\displaystyle {\hat {U}}_{t}={\frac {U_{t}}{\max(1,{\text{RMS}}(U_{t})/d)}}}$
  • Update parameter: ${\displaystyle X_{t}=X_{t-1}-\alpha _{t}{\hat {U}}_{t}}$
• End for

Adafactor for Weighted Matrices

Inputs:

• Initial point: ${\displaystyle X_{0}\in \mathbb {R} ^{n\times m}}$
• Relative step sizes: ${\displaystyle \rho _{t}}$ for ${\displaystyle t=1}$ to ${\displaystyle T}$
• Second moment decay: ${\displaystyle {\hat {\beta }}_{2t}}$ for ${\displaystyle t=1}$ to ${\displaystyle T}$, with ${\displaystyle {\hat {\beta }}_{21}=0}$
• Regularization constants: ${\displaystyle \epsilon _{1},\epsilon _{2}}$
• Clipping threshold: ${\displaystyle d}$

Algorithm:

• For ${\displaystyle t=1}$ to ${\displaystyle T}$:
  • Compute adaptive step size: ${\displaystyle \alpha _{t}=\max(\epsilon _{2},{\text{RMS}}(X_{t-1}))\rho _{t}}$
  • Compute gradient: ${\displaystyle G_{t}=\nabla f_{t}(X_{t-1})}$
  • Update row-wise second moment: ${\displaystyle R_{t}={\hat {\beta }}_{2t}R_{t-1}+(1-{\hat {\beta }}_{2t})(G_{t}^{2}+\epsilon _{1}1_{n}1_{m}^{T})1_{m}}$
  • Update column-wise second moment: ${\displaystyle C_{t}={\hat {\beta }}_{2t}C_{t-1}+(1-{\hat {\beta }}_{2t})1_{n}^{T}(G_{t}^{2}+\epsilon _{1}1_{n}1_{m}^{T})}$
  • Update overall second moment estimate: ${\displaystyle {\hat {V}}_{t}={\frac {R_{t}C_{t}}{1_{n}^{T}R_{t}}}}$
  • Compute normalized gradient: ${\displaystyle U_{t}={\frac {G_{t}}{\sqrt {{\hat {V}}_{t}}}}}$
  • Apply clipping: ${\displaystyle {\hat {U}}_{t}={\frac {U_{t}}{\max(1,{\text{RMS}}(U_{t})/d)}}}$
  • Update parameter: ${\displaystyle X_{t}=X_{t-1}-\alpha _{t}{\hat {U}}_{t}}$
• End for

Why Clipping

Adafactor employs clipping to maintain numerical stability, especially since it is designed for use with very large models and often works with unscaled learning rates.

• Clipping prevents the update step from becoming very large, which would destabilize training
• Clipping mitigates the effects of very large gradients preventing numerical instability

Therefore, implementing clipping helps ensure stability and efficient training without requiring per-parameter scaling like Adam.

Why Adafactor is more memory efficient, compared to Adam

• ${\displaystyle R_{t}={\hat {\beta }}_{2t}R_{t-1}+(1-{\hat {\beta }}_{2t})(G_{t}^{2}+\epsilon _{1}1_{n}1_{m}^{T})1_{m}}$
• ${\displaystyle C_{t}={\hat {\beta }}_{2t}C_{t-1}+(1-{\hat {\beta }}_{2t})1_{n}^{T}(G_{t}^{2}+\epsilon _{1}1_{n}1_{m}^{T})}$

Instead of storing the full ${\displaystyle G_{t}^{2}}$, Adafactor computes the row and column respectively, which reduces the memory requirements from ${\displaystyle O(n\times m)}$ to ${\displaystyle O(n+m)}$

• ${\displaystyle {\hat {V}}_{t}={\frac {R_{t}C_{t}}{1_{n}^{T}R_{t}}}}$

This updates the second momentum based on the outer product ${\displaystyle R_{t}C_{t}}$. However, this is not ${\displaystyle O(n\times m)}$ since the operation is performed element-wise, and only storing ${\displaystyle R_{t}}$and ${\displaystyle C_{t}}$ instead of storage the full second-moment matrix

4. Proposed Hyperparameters for Adafactor

• Regularization constant 1: ${\displaystyle \epsilon _{1}=10^{-30}}$
• Ensures numerical stability by preventing division by zero in the calculation of second-moment estimates, so the numerical value should be very close to zero
• Regularization constant 2: ${\displaystyle \epsilon _{2}=10^{-3}}$
• Help to stabilize parameter updates by controlling the effect of second-moment scaling in low-magnitude scenarios. Compared to ${\displaystyle \epsilon _{2}}$, a relatively larger value ensures the stability of noise and low-magnitude scenarios.
• Clipping threshold: ${\displaystyle d=1}$
• A threshold of 1 balances stability and learning efficiency. It avoids excessive suppression of large gradients, which could hinder learning, while still protecting against extreme updates that could destabilize the model.
• Relative step size: ${\displaystyle \rho _{t}=\min(10^{-2},1/{\sqrt {t}})}$
  • ${\displaystyle min(10^{-}2,...)}$ can caps the learning rate at 10^-2, which is a empirical found for upper bound
  • ${\displaystyle {\frac {1}{\sqrt {t}}}}$ This step size promote convergence of the model. This rate ensures a balance between sufficient exploration in early iteration and stability in later iterations
• Second moment decay: ${\displaystyle {\hat {\beta }}_{2t}=1-t^{-0.8}}$
  • 1-...: ensures the decay factor remains close to 1
  • ${\displaystyle t^{-0,8}}$ the power 0.8 ensures a balance between rapid adaptation in early training and later iterations

Numerical Examples

Applications

Conclusion

Reference