Social and institutional kinds

While social kinds have received increasing attention, there are no universally accepted criteria for what makes a kind social. Very few philosophers even dare to propose such criteria.Footnote ² Instead the literature has produced a number of prototypical examples that are assumed to provide sufficient guidance for the debate. US dollar bill, recession, and student are all considered social kinds. The present paper identifies a specific kind of social kinds, and therefore rivals other accounts that have identified institutional kinds as a prominent subset of social kinds.

I will address three major points of contention in this debate on social and institutional kinds: mind-dependence, power, and functions. Mind-dependence has perhaps received the most attention.Footnote ³ Some, such as John Searle (Reference Searle1995, Reference Searle2010), have considered most or all social kinds to be mind-dependent. Searle’s theory is formulated in terms of facts rather than kinds but it suggests that social kinds are characterised by status functions which human agents assign to physical objects. Status functions specify the function of instances of a kind—for example, that a screwdriver is for installing and removing screws.

In response to Searle, cases of social kinds that do not appear to depend on mental states toward them have been pointed out, e.g., recessions (Thomasson Reference Thomasson2003). Muhammad Khalidi (Reference Khalidi2015) has distinguished three kinds of social kinds depending on whether (a) the existence of the kind depends on propositional attitudes toward the kind and whether (b) the existence of an instance depends on a propositional attitude toward the instance.Footnote ⁴

First, Khalidi suggests that for some social kinds, such as recession, neither the kind itself nor its instances depend on propositional attitudes toward them. An ancient economy might have suffered a recession without conceiving of it as such or having developed the concept. Second, in cases, such as US dollar bill, the dependence only holds for the kind not the instances. Searle (Reference Searle1995, 31) offers the example of a dollar bill which has fallen off the printing press and through a crack on the floor before anyone had propositional attitudes toward it. It is still a dollar bill. In a third type of cases, such as prime minister, both the kind and the instances depend on propositional attitudes toward them. If all people stopped thinking of Boris Johnson as prime minister of the UK, he would cease to be an instance of the kind.

The diversity of social kinds leads to the question whether there are systematic reasons why some kinds belong into the categories provided by Khalidi. Second-order kinds, such as institutional kind and my proposal of SCS-kind, serve to explain the specific dependence relations, amongst other things.

Closely linked to the issue of mind-dependence is the issue of the power of social kinds. Kinds such as departmental reimbursement form, US dollar bill, and chair of the board seem to have a special role in enabling social interaction that is different from that of a screwdriver. Searle described the screwdriver as a social object to which we have assigned a function, but it can fulfill its function in virtue of its physical makeup. From such cases Searle distinguishes institutional kinds which can fulfill their function independently of their physical makeup. They appear to have a special power.

Currency kinds such as 10 dollar bill are perhaps the most prominent example of such institutional kinds. Though 10 dollar bills are printed on cotton-linen fabric, this physical substrate might be replaced with plastic in the future and, in principle, the bills can fulfill their function if they were made of stone (cf. Friedman Reference Friedman1994). The general presumption is that the minds of individuals lead to a dissociation between physical makeup and social power of the kind instances. Our representations of the objects, be they made of cotton-line or stone, enables them to exert power in social interactions.

That some instances of social kinds enable complex social interactions independently of the physical makeup is one of their most intriguing features. Searle seeks to explain this capacity of a subset of social kinds by attributing deontological powers to them—that is, facts about institutional kinds are supposed to give us desire-independent reasons for action.Footnote ⁵ The status of someone as chair of the board gives members of the relevant organisation desire-independent reasons to follow the chair’s orders.Footnote ⁶

Another approach to the power of a subset of social kinds has been game theoretical. Such an alternative account of institutions has been developed by Francesco Guala and Frank Hindriks (Reference Guala and Hindriks2015; Guala Reference Guala2016; Hindriks and Guala Reference Hindriks and Guala2019). They seek to unify a game-theoretical equilibrium-based account of institutional kinds with an account like that of Searle, where they interpret the status functions as providing rules for action. Their idea is that institutional kinds such as property and state border help to change games in a way that opens up different equilibria.

Guala and Hindriks discuss how two groups can avoid a fight over a scarce resource, e.g., grazing land, by creating rules about who can use and transfer the resource. Such rules allow the agents to settle on a better equilibrium, enabling action without costly fighting and thereby increasing overall payoffs. For the sake of simplicity, the groups can then call the resources “property” insofar as they are subject to such rules.Footnote ⁷ According to Guala and Hindriks, such institutional kinds can be understood as the result of introducing theoretical terms to reduce the cognitive load of the apparatus of rules (status functions) we have created to achieve better equilibria.

As a consequence, Guala and Hindriks account for the power of institutional kinds in quite a different way from Searle. There is no need for desire-independent reasons; instead, institutional kinds have their power in virtue of their role in changing the equilibria of social interactions. Put differently, institutional kinds have their power because of the features of the game they transform. If there were no possibility of the behavioural rules to affect the equilibrium, then the kinds would lack any power.Footnote ⁸

The two accounts also differ on the third issue concerning social kinds. Searle has argued that the functions of social kinds, be it the function of a screwdriver to screw or a dollar bill to serve as payment, are the result of what one might consider projection, i.e., the mental assignment of a status. Hindriks and Guala (Reference Hindriks and Guala2019) have accepted this as only one part of the story. They distinguish what they call the etiological functional from what they call the teleological function of institutional kinds. The etiological function is determined by the reasons for the kinds existence and persistence.Footnote ⁹ Teleological functions are normatively evaluative and projected upon the kinds by us. This part of their account resembles Searle’s, although Hindriks and Guala draw upon Dennett’s (Reference Dennett1987) notion of a design stance from which the institutional kinds are interpreted to explain the projection and do not require any we-intentionality.

According to Guala and Hindriks, the etiological function of institutional kinds is to generate cooperative benefits and their teleological function is to secure values—that is, support or promote values of members in society. In sum, institutional kinds have their causal source in the game theoretical benefits they create via cooperation, and we project upon them the function to secure values.

These three issues should receive attention when analysing a kind of social kinds. Is the kind of social kinds mind-dependent? Why do instances of this kind have power in social interactions? Are the kinds purposive and, if so, what is the source of their functions? The theory of SCS-kinds will have its distinctive place in these debates, and I will explicate connections and differences to prior work throughout the analysis. It will compete with theories of institutional kinds as explaining what is special about a subset of social kinds. While I do not deny that there might be instances of institutional kinds as sketched by Searle or Guala and Hindriks, SCS-kind is the explanatorily more significant second-order kind of social kinds.

The analysis will offer a functional account of a specific kind of social kinds just as theories of institutional kinds do, but it will identify a different function than Guala and Hindriks. It will refer to the minds of agents, but it will not be a projective account of the sort proposed by Searle. The key to this kind of social kinds and their power lies in their role in social computations—more specifically, computational social processes which the kinds support. In the next section, I discuss these computations.

Social computations

Not all cases of social computations involve SCS-kinds, but the analysis of SCS-kinds requires the notion of a social computation. The type of social kinds is analysed as supporting social computations.

Social computations are computational processes realised by social groups. A computational process is a social computational process if and only if it is instantiated by a social group. The groups serve as the physical computing systems manifesting the computational processes. A team of researchers engaging in a calculation—for example, calculating the potential impact of a nuclear bomb during the Manhattan project—is one instance of social computation. Here a team, not just one member on the team, instantiates a computational process.

A more ambitious example of social computation is a family organising their next vacation by allocating various subtasks to its members. The parents might check flights and implement a sorting algorithm, while a daughter identifies available hotels according to specific search criteria. Later the results are combined in a rule-governed manner. As long as the family follows a procedure that is correctly described as a computation spread out across its members, it will serve as another example of social computation, albeit not necessarily of SCS-kinds.Footnote ¹⁰

I do not endorse a specific account of physical computation (cf. Piccinini Reference Piccinini and Zalta2017). On the one end of the spectrum are extremely permissive accounts, such as various forms of pancomputationalism (Putnam Reference Putnam1988; Searle Reference Searle1992; Chalmers Reference Chalmers1996) and Dennett’s design stance theory (Reference Dennett1987). According to these theories, either all or an overwhelmingly large number of social groups are computing systems. Pancomputationalism turns all physical systems, which I take to include all social groups, into computing systems because their behaviour can be mapped to formal specifications of computing systems. For Dennett’s theory, the question is whether interpreting a physical system as a computing system from a design stance brings a predictive benefit. If it helps to interpret the family as implementing computational algorithms to predict the decision they reach, then it is a computational system.

On the other end, we find more restrictive accounts, e.g., syntactic (Fodor Reference Fodor1975, Reference Fodor1981) and mechanistic accounts (Piccinini Reference Piccinini2015; Coelho Mollo Reference Coelho Mollo2018). On these accounts, computing systems are typically distinguished by a stance-independent function. Independently of the interpretation by human agents, physical computing systems have either the function of syntactic manipulation or the function of mechanistic rule-application to medium-independent vehicles.Footnote ¹¹

I assume that even on the more restrictive accounts there will be sufficient cases of social computation to render SCS-kinds of interest (see Strohmaier, manuscript). For example, on a mechanistic account like that of Piccinini, the function of a team of researchers might be to manipulate strings of formulas according to rules to arrive at a result fulfilling certain constraints. These strings would be medium-independent vehicles.

Assuming that social computations are widespread might appear audacious, especially given that restrictive accounts of computation are one option, but it is not without precedent. In the following, I will discuss previous proposals of social computation in cognitive science and philosophy of mind before I point out similar theories in the social sciences.

In philosophy, the existence of social computation is usually implied by even stronger cognitive claims. Theories of the extended mind conceive of smartphones as extensions of human cognition because they are integrated in one computational process (Hutchins Reference Hutchins1995; Clark and Chalmers Reference Clark and Chalmers1998; Gallagher Reference Gallagher2018). For example, the cognitive process of geographical orientation happens partially through the extension of Google maps.

Such theories of extended cognition have also been applied to social groups and institutions. Shaun Gallagher has suggested that cognitive processes are “constituted in various social practices that occur within social and cultural institutions” (Gallagher Reference Gallagher2013, 4; see also Gallagher and Crisafi Reference Gallagher and Crisafi2009). On this account, some institutions—for example, institution in legal proceedings—serve to support the extended cognition of human agents. As long as these cognitive processes are computational processes, they are instances of social computation (cf. Huebner and Jebari Reference Huebner, Jebari, Sprevak and Colombo2019).

Coming from a different direction, theories of group agency also postulate social computations under reasonable assumptions. These accounts argue that organisations, and even entire nation states, are agents with propositional attitudes. Assuming that propositional attitudes can be analysed as computational states, theories of group agency also postulate social computation (List and Pettit Reference List and Pettit2011; Huebner Reference Huebner2014; Tollefsen Reference Tollefsen2006, Reference Tollefsen2015). The internal cognitive processes of group agents, if there are any, would serve as prime examples of social computation.Footnote ¹²

Both theories of the extended mind and group agency apply cognitive concepts to social processes. Talk about computation avoids such strong claims about cognition, because it does not claim the processes are cognitive. It commits us neither to the cognition of individuals extending beyond their cranium nor to the agency of groups. Consequently, the analysis of SCS-kinds avoids many controversies surrounding the extended mind and group agency.

For example, Adams and Aizawa (Reference Adams and Aizawa2008) have argued that purported instances of extended minds lack the mark of the cognitive, which they proposed was nonderived representational content. But for social computation no such content is required. While the representational content of the computations across a team in the Manhattan project might be derived, the process would still be a computation implemented by the group. The mark of cognition is not a mark of computation. Thus, even if Adams and Aizawa’s argument were to succeed, it would not undermine my proposal.

Similarly, the theory of social computation does not require any groups to be full-blown agents with desires and beliefs or equivalent mental states. If mental states such as beliefs and desires are computational states, they are special ones and not realised in the course of all computational processes (cf. Huebner Reference Huebner2014). A pocket calculator has no desires. As far as the proposal of SCS-kinds goes, the groups might in their capacities be closer to pocket calculators than to human agents. While the assumption of social computations is far from trivial, it isolates the less controversial part of some of the proposals in the social cognition and social ontology literature.

In addition to cognitive science and philosophy, conceiving of social processes as computational processes has a history in the social sciences. One of the first approaches along these lines was the Carnegie School of organisational behaviour. Under the influence of Herbert Simon (March and Simon Reference March and Simon1958), it described organisations as implementing procedures. Organisations were understood in terms of computational processes.

More recently, the field of computational social sciences follows “an information processing paradigm of society” (Cioffi-Revilla Reference Cioffi-Revilla2017, 2; emphasis in the original). It describes various social arrangements as complex adaptive systems that process information and are subject to a computational methodology. While it is not always clear whether the social processes are merely computationally modelled or in fact computational themselves, there is a close affinity to the present proposal.

As can be seen, there is sufficient support for my assumption of widespread social computation in cognitive and social science, and I am relying only on a moderate version of the claim.

In addition to the concept of social computation, the analysis of SCS-kinds will also require the notion of a realising agent. Intuitively, when a team engages in a calculation and one person engages in one part of the overall process, say calculating one variable, they are a realising agent of this computation.

A group member, A, is a realising agentFootnote ¹³ of a social computational process, P, if and only if:

1. (1) P is composed of the subprocesses p ₁, p ₂, …

2. (2) At least one of these subprocesses is realised by A.

I assume here that computational processes allow a mereological analysis, i.e., that they can be understood as either atomic or composed of multiple subprocesses.Footnote ¹⁴

Not all subprocesses have to be instantiated by group members for a process to be a social computation. Some might be implemented using digital devices such as smartphones or pocket calculators, as suggested by the extended mind literature. In some cases, the entire social computation might be automated so that there are no realising agents, for example in a quantitative trading computation. That being said, SCS-kinds will have their effect on social computations in virtue of their specific relation to the realising agents, as the next section describes.

SCS-kinds

Among social kinds there is a class of social-computation-supporting kinds, or SCS-kinds for short. Paradigmatic examples include departmental reimbursement form, US dollar bill, and chair of the board. An SCS-kind has the function of enabling social computations by serving as a cognitive resource to the participants. Thus, a social-computation-supporting kind is distinguished by its function.

One aspect of the function of the kind departmental reimbursement form is to figure in the cognitive processes of agents instantiating social computations. For example, the kind can help a philosophy department to implement a more efficient accounting process than unsorted receipts. That the personnel interprets the sheet of paper accordingly is a condition for it fulfilling its function.

Formally, a social kind, K, is an SCS-kind if and only if instances of K have a function that for a social computational process P:

1. (1) The instance is represented as K in subprocesses of P by realising agents.

2. (2) In virtue of this representation, P is computationally more powerful or efficient than the social processes Q, R, … ,

3. (3) where Q, R, … are the most similar possible social processes where no instance of K is represented as such by the realising agents.

This analysis describes SCS-kinds as difference-making with regard to social processes, i.e., to processes realised by social groups. As can be seen, this description captures the intuitive case of the departmental reimbursement form. Such forms make the operation of the department more efficient because the department members represent it appropriately as demanded in the second condition. While many kinds may support social computations, SCS-kinds do so in virtue of being represented by realising agents.

In the remainder of this section, I will unpack the analysis of SCS-kinds by first discussing the notion of function at play, then providing more details about the role of social computations, and finally discussing the requirement of representation by realising agents.

The significance of SCS-kinds

I have put forward SCS-kinds as an alternative kind of social kinds, competing with theories of institutional kinds, but isolating SCS-kinds does not only serve to satisfy our curiosity about what makes the social realm special. SCS-kinds have an important place in explaining the achievements and shortcomings of social arrangements. I have already mentioned the theory of the firm as one example in economics. The theory of SCS-kinds is of wide-reaching significance for human society.

Previous research into social kinds either focusses on what makes them metaphysically peculiar (e.g., Searle Reference Searle1995, Reference Searle2010) or on their role for achieving social justice (e.g., Haslanger Reference Haslanger1995, Reference Haslanger2000, Reference Haslanger2005). Independently of the value these projects have, they only cover part of the impact of social kinds and SCS-kinds in particular. The historical growth of societal capacities has its roots at least partially in SCS-kinds innovation. SCS-kinds, such as various types of forms, are a key component of bureaucratic organisation and thereby explain increased state and firm capacities.

Future research should provide the basis for modelling the societal impact of SCS-kinds. Their computational nature should make such a project easier. Despite the differences between digital computations and social computations, building an approximate computational model of the latter should be feasible.Footnote ³³ Importantly, the theory of SCS-kinds justifies an interpretation of these computational models as directly reflecting the computational aspects of social reality. Social ontology and computational social science meet in the analysis of SCS-kinds.

Research does not have to stop at analysing the current state of SCS-kinds, it can seek to improve upon them. Even well-functioning SCS-kinds rarely optimise the power of social computations because they only outperform the most similar social processes. The lack of optimisation opens a novel approach to research of great significance for human progress. Which innovation in social kinds could increase the computational power of our social arrangements? Which SCS-kinds could make processes in organisations computationally more efficient, and would their adoption free resources? Such questions are not solely the domain of economics and organisational theory. By investigating SCS-kinds and how they are to be modelled, philosophers can contribute to the well-functioning of social processes.

For example, philosophers could investigate whether design patterns from software design are applicable to SCS-kinds. Can we improve social processes by drawing on best practices in object-oriented programming for the creation of social kinds? Can we group social kinds in similar ways as software engineers have grouped styles of programming? Philosophers with awareness of the fundamental differences between computations as they occur in social groups and in digital devices are especially well placed to evaluate such proposals. If philosophers redirect their investigations into social ontology as suggested, they are well placed to facilitate such cross-disciplinary innovation.

Of course, the functions of social computations can also be investigated with a critical eye (see also Gallagher Reference Gallagher2013). A powerful bureaucratic organisation might implement a social computation very well, but at the same time achieve a morally dubious goal or might simply, in virtue of its effectiveness, be a cage to human individuality along the lines of Max Weber’s ( [1921–1922] Reference Weber2013) iron cage of modernity. The actions of individuals become minuscule contributions to an overall computational process and are thereby reduced to subprocesses. Especially by drawing on the science and technology studies, research into SCS-kinds can shed light on these issues.

One investigation that appears especially pressing in the current moment is the effect of introducing digital devices into social groups. Understanding the computational nature of SCS-kinds can help to see how these changes reinforce Weber’s worries. While SCS-kinds used to be employed by human agents, their usage is increasingly tracked and enforced by digital devices. No longer can the accounting department gloss over an empty field in a departmental reimbursement form because now the accounting software requires an entry. As a consequence, the social computations SCS-kinds support become more restrictive. With help of the theory of SCS-kinds, philosophers can investigate how to redesign these kinds to promote human autonomy in social processes.

That SCS-kinds lie at the touching point of multiple inquiries promises renewed relevance to social ontology. The significance of these kinds is interdisciplinary. Research into them will require methodological innovation, at least in applying methods from other fields to social ontology. Which formalisms for describing digital computations are applicable to describe roles in organisations? Where do the abstractions fail? New research directions and methodological challenges are waiting for those willing to view social kinds from a computational perspective.