4.1. Case 1: Guiding mathematical intuition

Here, I consider a case from low-dimensional topology in which researchers use deep learning to guide mathematical intuition concerning the relationship between two classes of properties of knots. Knots are interesting topological objects because the relationships between their properties are poorly understood, while their connections to other fields within mathematics are plausible but unproven.

In Davies et al. (Reference Davies, Veličković, Buesing, Blackwell, Zheng, Tomašev, Tanburn, Battaglia, Blundell, Juhász, Lackenby, Williamson, Hassabis and Kohli2021), mathematicians seek to discover and prove a conjecture that establishes a mathematical connection between known geometric and algebraic properties of knots in ${\mathbb{R}^3}$ . In particular, the aim is to establish that hyperbolic invariants of knots (e.g., geometric properties of knots that are identical for all equivalent knots) and algebraic invariants of knots are connected. While the possibility of this connection had been imagined, its plausibility had not been established empirically and certainly not proved mathematically. As a result, mathematical intuition concerning a possible connection was too vague for genuine insight to emerge.

The deep learning approach in Davies et al. (Reference Davies, Veličković, Buesing, Blackwell, Zheng, Tomašev, Tanburn, Battaglia, Blundell, Juhász, Lackenby, Williamson, Hassabis and Kohli2021) begins by imagining that the geometric invariants $X$ of a given knot $K$ are, in fact, connected to that knot’s algebraic invariants $Y$ . The algebraic invariant $\sigma \in Y$ called the “signature” is known to represent information about a given knot’s topology. The researchers hypothesized that a knot’s signature $\sigma \left( K \right)$ is provably related to its hyperbolic invariants $X\left( K \right)$ such that there exists some function $f$ such that $f\left( {X\left( K \right)} \right) = \sigma \left( K \right)$ (Figure 1a). They then constructed a dataset of observed hyperbolic invariants and signatures for individual knots and trained a DLM to predict the latter from the former (Figure 1b). If the resulting DLM (Figure 1c) achieves an accuracy better than chance on a holdout set, then this provides researchers with reasons to expect that some mathematical relationship must obtain between $X\left( K \right)$ and $\sigma \left( K \right)$ . Importantly, however, accepting this claim ultimately serves no role in proving the conjectured mathematical relationship.

In fact, the initial DLM achieved an accuracy of roughly $0.78$ , giving researchers high confidence that a connection between hyperbolic invariants and algebraic invariants obtains. While the established plausibility of the connection might be sufficient to find a promising conjecture, it is possible to isolate the various geometric invariants most responsible for the accuracy of $\hat f$ . Specifically, by quantifying the change in the gradient of the loss function with respect to each of the individual geometric invariants, ^{Footnote 6} it is possible to guide attention to a subset of hyperbolic invariants to consider when formulating a conjecture (Figure 1d). In particular, three such invariants are found to be most responsible for DLM accuracy in predicting signatures: the real and imaginary parts of the meridional translation $\mu $ and the longitudinal translation $\lambda $ .

From these elements, mathematicians used their intuition to formulate an initial conjecture (Figure 1e) that relates $\mu \left( K \right)$ and $\lambda \left( K \right)$ to $\sigma \left( K \right)$ by means of a novel conjectured property which they call the natural slope ( ${\rm{Re}}\left( {\lambda /\mu } \right)$ , where ${\rm{Re}}$ denotes the real part of the meridional translation) of $K$ . Using common computational techniques, corner cases were constructed that violate the initial conjecture, which was, in turn, refined into the following theorem.

Theorem: There exists a constant $c$ such that, for any hyperbolic knot $K$ ,

$$\left| {2\sigma \left( K \right) - {\rm{slope}}\left( K \right)} \right| \le c\,{\rm{vol}}\left( K \right)\;{\rm{inj}}{(K)^{ - 3}}.$$

Let’s call the above theorem $T$ . That $T$ is true is provable. As a result, justification for belief in the truth of $T$ does not lie in any empirical considerations. Nor does it rely on any facts about how the conjecture was arrived it. That is, the proof for $T$ does not depend on any of the steps that were taken for its discovery. Its justificatory status is not diminished by the fact that a number of assumptions were made in the process of its discovery, nor that an opaque model aided in the decision to take seriously the connection between hyperbolic and algebraic properties.

One might object to the claim that the opacity of the network in this case was epistemically irrelevant. After all, the gradient-based saliency method used to isolate the contribution to accuracy of the various inputs might be viewed as an interpretive step. Yet, it is important to note that this saliency procedure was applied to the input layer which is, necessarily, transparent to begin with. Ultimately, then, what this saliency method adds is computational expediency as, alternatively, it was possible to use a simple combinatorial approach to iteratively search through the input space for the most predictive properties. In this way, saliency adds nothing of epistemic relevance to the process that would not have been possible without it. Moreover, saliency is not required for justification. Nevertheless, as we will see, Case 2 is an example in which no such interpretive step is taken.

4.2. Case 2: Deep learning for theory improvement

This case demonstrates the use of deep learning to dramatically improve our understanding of the geophysics of earthquakes by providing researchers good reasons to consider integrating known geophysical properties into existing theory. Consistent with the central claim of this paper, the neural network itself, while opaque, neither contributes nor withholds anything of epistemic importance to the justificatory credentials of the reworked theory.

The geophysics of earthquakes is poorly understood. In DeVries et al. (Reference DeVries, Viégas, Wattenberg and Meade2018), scientists seek to improve theory that describes the dynamics relating aftershocks to mainshocks. The best available theoretical models of aftershock triggering dynamics correctly predict the location of an aftershock with an $AUC = 0.583$ . As the authors point out, while “the maximum magnitude of aftershocks and their temporal decay are well described by empirical laws […] explaining and forecasting the spatial distribution of aftershocks is more difficult” (DeVries et al. Reference DeVries, Viégas, Wattenberg and Meade2018, 632).

To overcome this difficulty, scientists turn to deep learning to evaluate whether and to what extent it is possible to functionally relate mainshock and aftershock locations. After all, if an essentially stochastic process relates locations, then perhaps the extant theory is empirically adequate. As in Case 1, researchers begin by imagining that aftershock locations are a function $f$ of mainshocks and seek to find an approximation of that function, $\hat f$ (Figure 1a). To operationalize this, they construct a dataset of mainshock and aftershock events by representing the planet as a collection of $5{\rm{\;k}}{{\rm{m}}^3}$ tiles (Figure 1b). A tile is experiencing a mainshock, an aftershock, or no shock at any given moment. For the purposes of relating events, it is sufficient to treat the prediction as a simple binary classification task (Figure 1c). Given an input (mainshock parameter values and affected tiles), the task is to classify every terrestrial tile as either “aftershock” or “not aftershock.”

The fully trained DLM correctly forecasts the locations of aftershocks between one second and one year following a mainshock event with an $AUC = 0.85$ , significantly outperforming theory. This gives researchers good reason to take seriously the possibility of further improving theory (Figure 1d). Yet, this reason is not implicated in, nor relevant to, justifying the reworked theory.

The DLM outputs a probability distribution of “aftershock” over tiles. The researchers compare this distribution to the one predicted by extant theory. Surprisingly, they observe that the probability of aftershock within a certain radius of a mainshock assigned by theory is largely uncorrelated with the probabilities assigned by the DLM. At this point, the DLM’s predictive power is treated as evidence that theory can be significantly improved, thereby guiding the process of discovery.

Given the network’s high accuracy, it is reasonable to assume that an improved theory would more closely resemble the observed probability distribution generated by the network. By iteratively sweeping through known geophysical properties and correlating them with DLM distributions, they find that three parameters (maximum change in shear stress, the von Mises yield criterion, and aspects of the stress-change tensor), that had not been considered by geophysicists as relevant, in fact explain nearly all of the variance in predictions generated by the neural network, thereby providing novel physical insight into the geophysics of earthquakes (Figure 1e).

In this case, a fully opaque DLM has profound implications for our theoretical understanding of earthquake dynamics. Namely, the ability to accurately predict phenomena orients scientific attention to empirical desiderata necessary for more accurate theory building. Moreover, it is epistemically irrelevant to justifying the improved theory that we cannot verify whether and how any of the geophysical quantities that were determined to be of relevance are, in fact, represented in the network. This is because it is not the network’s predictions that stand in need of justification but, rather, the theory’s itself. The reworked theory is justified in ways that are consistent with the norms of the discipline—it relates known geophysical properties in ways that are consistent with first principles, it aids in the explanation and understanding of aftershock dynamics, and it outperforms extant theory in prediction. Yet, none of this depends on the neural network that was used to lead attention to relevant revisions of the theory for justification. ^{Footnote 7}