Derive by hand the optimal configurations (architecture and weights) of “vanilla” neural networks (multilayer perceptrons; ReLU activations) that implement basic mathematical functions (e.g. absolute value, minimum of two numbers, etc.)

Identify “features” and “circuits” of these networks that are reused repeatedly across networks modeling different mathematical functions

Verify these theoretical results empirically (in code)

What follows is a brief introduction to this work. For full details, please see:

The linked video (also embedded at the bottom of this post)

Or if you prefer to go at your own pace, the slides I walk through in that video

Motivation

Olah et al. make three claims about the fundamental interpretability of neural networks:

They demonstrate these claims in the context of image models:

Features / Circuits:

Universality:

This work demonstrates the same concepts apply in the space of neural networks modeling basic mathematical functions.

Results

Specifically, I show that the optimal network for calculating the minimum of two arbitrary numbers is fully constructed from smaller “features” and “circuits” used across even simpler mathematical functions. Along the way, I explore:

## Mathematical Circuits in Neural Networks

Link post

(Also posted on the EA Forum)This is one of my final projects for theColumbia EA Summer 2022 Project Based AI Safety Reading Group(special thanks to facilitators Rohan Subramini and Gabe Mukobi). If you’re curious you can find my other projecthere.SummaryIn this project, I:

Derive by hand the optimal configurations (architecture and weights) of “vanilla” neural networks (multilayer perceptrons; ReLU activations) that implement basic mathematical functions (e.g. absolute value, minimum of two numbers, etc.)

Identify “features” and “circuits” of these networks that are reused repeatedly across networks modeling different mathematical functions

Verify these theoretical results empirically (in code)

What follows is a brief introduction to this work. For full details, please see:

The linked video (also embedded at the bottom of this post)

Or if you prefer to go at your own pace, the slides I walk through in that video

MotivationOlah et al. make three claims about the fundamental interpretability of neural networks:

They demonstrate these claims in the context of image models:

Features / Circuits:Universality:This work demonstrates the same concepts apply in the space of neural networks modeling basic mathematical functions.

ResultsSpecifically, I show that the optimal network for calculating the minimum of two arbitrary numbers is fully constructed from smaller “features” and “circuits” used across even simpler mathematical functions. Along the way, I explore:

“Positiveness” and “Negativeness” Detectors

Identity Circuits (i.e. f(x) = x)

Negative Identity Circuits (i.e. f(x) = -x)

Subtraction Circuits (i.e. f(x1, x2) = x1 - x2)

“Greaterness” Detectors

And More

Minimum Network:I also demonstrate that each of these theoretical results hold in practice. The code for these experiments can be found on the GitHub page for this project.

Full DetailsFor full details, please see the PDF presentation in the GitHub repo or watch the full video walkthrough: