2. An analysis of topological explanations

To appreciate this idea, it is important to provide some background about how the T1–T4 schema is used in actual science and, in this particular example, in neuroscience.

A central issue in network neuroscience is the relationship between structure and function. “Structure” refers to networks of anatomical connections in the brain, also known as structural connectivity models. In structural connectivity models, the connections between nodes are based on physical connections between brain areas. However, “function” refers to various ways in which information is transmitted in the brain. Functional connectivity models define edges based on statistical relations between area activity time series, such as a correlation coefficient, or synchronization index. Both types of connectivity are physically embedded in the 3D volume of the human skull.

Such physical embedding should be guided by some natural constraints on development and evolution of brain networks. The most salient feature of brain networks is unexpectedly short structural edges, also known as “wires.” This feature is indicative of wiring minimization in the evolution and dynamics of brain networks (Stiso and Bassett Reference Stiso and Bassett2018, 256). Presumably, wiring minimization allows for efficient information processing in the system, where efficiency can be understood as low metabolic cost for establishing or maintaining connections. In terms of topological properties, wiring minimization is characterized by fewer long-range wires, which in turn facilitates redundancy and dynamical complexity (ibid., 257). To understand how wiring minimization differs across individuals in healthy brains and in neurodevelopmental disorders such as schizophrenia Stiso and Bassett suggest looking into the volumetric constraints on the wiring minimization. A way to do it is by examining the Rentian scaling properties of the 3D volume of the human skull. Such properties are assessed by calculating Rent’s exponent (which quantifies the fractal scaling of the number of connections to or from a region of the brain). In the context of brain networks, the Rent’s exponent is computed by placing randomly sized boxes (which capture the volume of the human brain in three geometric dimensions), and then by counting the number of edges crossing the boundary of a given box, as well as the number of nodes contained in the box. Their explanation of how topological structure explains cognitive function describes counterfactual dependence between wiring minimization and Rentian scaling (ibid., 259). In this case, the explanation-seeking question is:

The answer is that the topological volumetric constraints determine the wiring costs in the evolution and development of brain networks, and wiring costs are inversely proportional to the efficiency in both signal processing and establishing new connections. This also bears on understanding the differences in topological properties in health and in neurodevelopmental disease. For example, path length (an average number of edges that need to be traversed in a network) in healthy brains is short (meaning that fewer number of edges need to be traversed to reach any node in a network), which enables very efficient signal processing across brain areas. In contrast, path length is longer in Alzheimer’s disease or schizophrenia, which—given the same volumetric constraints of the human skull as in healthy brains—explains why in such disorders signal processing is inefficient or even disrupted.

At this point we can apply the analysis of topological explanations from the preceding section to this example:

And here is where the T4 condition provides relevance criteria for both the explananda and explanantia as well as for the explanatory relation. Unpacking this condition, which is the goal of the next section, effectively provides an account of explanatory relevance for noncausal explanations.

3. Perspectival constraints, why questions, and explanatory relevance

Following van Fraassen’s claim that all explanations are answers to why questions (Van Fraassen Reference Van Fraassen1980), topological explanations are such answers, in which explanantia and explananda stand in a counterfactual dependence relation, that is, the why question “why is wiring minimization in healthy subjects high (rather than low)?” is answered by the counterfactual “had the brain functional connectivity networks in healthy subjects had a Rent’s exponent F rather than F’, it would have displayed wiring minimization G rather than G’,” where F and F’ are topological explanans properties and G and G’ are physical explanandum properties.

The task of showing how the T4 condition provides explanatory relevance criteria, can be broken down into two more manageable chunks. One is to define what an explanation-seeking question is. And the other is to identify conditions when it is relevant. I take each of these tasks in turn in the following subsections.

4. Ontic backing, pragmatics, and explanatory relevance criteria

In this section I discuss how the account of pragmatics of explanation developed in the previous sections compares to some alternatives, such as the ontic backing. The ontic backing problem has been formulated in at least two senses. In one sense, it concerns the veridicality of explanantia and explananda. For example, Craver argues that functional connectivity models cannot be explanatory because they are not modeling the “right” kind of stuff (Craver Reference Craver2016). This idea can best be understood in terms of Rice’s (Reference Rice2019, 181–82) discussionFootnote ⁴ of the mechanistic decomposition strategy, which according to him involves the following assumptions:

1. (1) Target decomposition, that is, that the real-world system is decomposable into its difference-making component parts as well as its irrelevant parts;

2. (2) Model decomposition, that is, that a scientific model is decomposable so that the contributions of its accurate parts can be isolated from its inaccurate parts; and

3. (3) Mapping, that is, the accurate parts of a model can be mapped onto the relevant components of the real-world system and the inaccurate parts distort only the irrelevant parts (ibid.).

However, in functional connectivity models the brain is not decomposed into its difference making parts. The nodes in such a network are blood-oxygen level dependent (BOLD) signals in arbitrary chosen areas of the brain obtained from fMRI data sets and the edges are synchronization likelihoods between BOLD signals (Suárez et al. Reference Suárez, Markello, Betzel and Mišić2020).Footnote ⁵ As such, BOLD signals do not have distinct causal roles. This bears on the model decomposition as well because all the parts of the network model are inaccurate, that is, nodes and edges are not difference-making components but arbitrary parts. Finally, because there are no target nor model decompositions, that is, no difference making components and the whole network model is inaccurate, there cannot be any mapping between the accurate parts of the model to the relevant parts of the target real-world system either. Furthermore, Rent’s exponent determines the wiring costs in any network, not just in spatially embedded brain ones, thus it is neither a difference maker in a system nor accurate part of the model. So, if the decomposition strategy does not even apply to functional connectivity network models, then indeed, what is the relevance of their topological properties to the physical phenomenon we are trying to explain?

A quick answer to this worry is that the conditions T1 and T2 in the general account of noncausal explanation are already veridical. For example, if contagion networks were not small world, then small worldliness (as a topological property F) does not explain why diseases spread as quickly as they do (empirical property G). So, even approximate measures of a topological property F and a physical property G, already suffice for explanation’s connection to physical reality. Now, an approximate accuracy of explanantia and explananda alone does not guaranty explanatoriness, but supplementing it with the counterfactual dependence, as the T3 condition, as well as with the relevance criteria provided by T4, does.

However, even this is not the end of the worry, as ontic theorists do ask in virtue of what the counterfactual dependence holds, what are its truth makers?

For example, it has been argued recently that explanations, in which counterfactual dependence serves as an explanatory relation, require some kind of ontic backing to be explanatory (Craver and Povich Reference Craver and Povich2017; Povich Reference Povich2021). Povich (Reference Povich2021, 24) expresses this worry aptly:

Povich envisages several reasons due to which counterfactual dependence might hold, for example, when the explanans and explanandum are identical, the explanans constitutes the explanandum, the explanans causes the explanandum, and finally the explanans grounds, instantiates or realizes the explanandum. It is obvious that identity and causation are not appropriate candidates because causal and noncausal facts by the very definition cannot be identical (if a fact is causal, it cannot also be noncausal and vice versa). Furthermore, causation requires temporal distinctness (causes precede their effects) between the explanans and explanandum, which our example with Rentian scaling lacks. Hence, we are left with the metaphysical relations such as constitution, grounding, and instantiation/realization. According to this view, we need to appeal to ontic backers to distinguish explanatory models from merely descriptive/predictive models. Here, an “ontic backer” is a truth maker for the counterfactual claim. Povich and Craver set up this problem specifically in terms of directionality and asymmetry problems, that is, that noncausal explanations lacking ontic backing are susceptible to explanatory asymmetry and directionality problems. The directionality problems are germane to asymmetry problems, but instead of using a simple reversal, in directionality problems the reversal is a contraposition. The directionality problem arises when an account of explanation cannot flag instances of contraposition of a purported explanation as nonexplanation (Craver and Povich Reference Craver and Povich2017; Kostić and Khalifa Reference Kostić and Khalifa2021). Kostić and Khalifa (Reference Kostić and Khalifa2021, 19) formulate it in the following way:

Directionality Requirement: If X explains Y, then not-Y’ does not explain not-X’, where X and Y are highly similar but not identical to X’ and Y’, respectively.

In response to these specific arguments, Kostić (Reference Kostić2020) and Kostić and Khalifa (Reference Kostić and Khalifa2021) have developed a so-called ontic irrelevance lesson for solving the asymmetry and directionality problems in topological explanations. On their view, even though one can posit any variety of ontic backing that Povich suggests, it would be superfluous because topological explanations can avoid directionality problems solely based on the property; counterfactual and perspectival directionality/asymmetry, each of which stems from the T1-T4 conditions in Kostić’s theory of topological explanations; and from the generalized theory of noncausal explanations developed in this article.

According to Kostić and Khalifa, a topological explanation is property directional when the explanans in an original explanation includes topological properties, but its contraposition does not. Topological explanation is counterfactually directional when in an original explanation counterfactual is true, but in its contraposition it is false. Note that this type of directionality does not concern the truth conditions of a counterfactual, it concerns merely how a counterfactual, and its contraposition are formulated. Finally, a topological explanation is perspectivally directional when an original explanation is an intelligible answer to an explanation seeking question, but its contraposition is not.

These three types of directionalities do not appeal to any kind of ontic backing that Povich requires. This is the core of ontic irrelevance lesson, that is, perhaps in some cases it would be possible to provide some sort of ontic backing, however, it would be superfluous because property, counterfactual, and perspectival conditions already ensure directionality on their own. The question is, could the ontic irrelevance lesson be generalized beyond asymmetry and directionality and apply to the general ontic backing problem?

As hinted earlier, the account of pragmatics of explanation is a fruitful route to answering this worry. One might ask under which conditions would an explanation require ontic backing? Prima facie, it seems plausible to assume that whenever the previously mentioned erotetic argument fails, it would be justified to ask for some alternative reason, such as ontic backing, why the counterfactual holds. However, imagine two situations:

It seems fair to say that in both situations it is not clear in what way the presence or absence of ontic backing contributes to explanatoriness. In S1, we know why the explanandum property G counterfactually depends on the explanans property F, that is, it is because F is erotetically implied direct answer to a properly formed why question. However, in S2, we know what is a truth maker for the counterfactual, but in the absence of relevance criteria we do not know why that particular truth maker and not some other ought to be cited in the explanation. Without explanatory relevance criteria even in situations in which some ontic backing is available, it is not clear why would ontic backing contribute to explanatoriness. Hence, the ontic backing seems like a superfluous requirement for explanatoriness in some noncausal explanations.