Learning to be prejudiced and creative

After graduating with an undergraduate degree in natural philosophy from St Andrews in 1943, Donald MacKay got a radar job with the British Admiralty. Tasked with automating ‘pilots’ and gunfire, MacKay designed ‘sense organs’ and electronics ‘to simulate situations … so as to provide goal-directed guidance for ships, aircraft, missiles and the like’.Footnote ¹⁸ Examining how combinations of humans and computers might be optimally deployed to perform specific tasks, MacKay wondered what activities might never be ‘conceived in mechanistic terms’ and subsequently automated.Footnote ¹⁹ Human brains struck him as quite dissimilar from either analogue or digital computers.Footnote ²⁰ MacKay sought to evaluate different arrangements of analogue and digital computers applied to a particular task by recognizing the unique affordances specific to different forms of calculation. Digital computers facilitated calculations of high accuracy using physical phenomena to represent ‘symbols in one–one correspondence with the set of numerals’.Footnote ²¹ In practice, calculation accuracy was limited by the difference between a number's value and the number of numerals that could be represented by the computer in memory. By contrast, analogue computers used physical magnitudes such as length or voltage to represent numerical magnitudes, which limited accuracy to usually just a few decimal places. Nevertheless, calculations like integration could be performed faster and cheaper with analogue machines than with digital ones.Footnote ²² Such trade-offs could make it difficult to know when to prefer one form of computing to the other, or, more importantly, how to best combine both to solve specific questions.

MacKay explored these trade-offs in an unpublished but widely circulated 1949 report, ‘On the combination of digital and analogue computing techniques in the design of analytical engines’. He defined ‘information’ as that which ‘changes’ the ‘valid[ity] in a logical pattern’ and computation as ‘transformations of information’.Footnote ²³ This scheme allowed for comparing combinations of analogue and digital computers. More exciting to MacKay was that describing the world as information transformations might facilitate the incorporation of human meaning into non-numerical uses of computing. MacKay suggested ‘human intercourse’ pertaining to the ‘compresence of [scientific] facts’ as a useful thought experiment.Footnote ²⁴ He imagined an ‘autonomous artefact’ that would collect disciplinary information, reduce that information to a ‘logical vocabulary’, identify ‘fresh conclusions’ and ‘fresh operations’, and ‘pursue an active, responsive, and logically-disciplined existence independent of human intervention’.Footnote ²⁵ This artefact would engage in something like ‘purposeful activity’ as the ‘attainment of a certain equilibrium configuration … of incoming or present information’.Footnote ²⁶ It might generate information from its ‘logical “mill” to a human interlocutor’, and use information provided by that ‘interlocutor’ as part of its subsequent input.Footnote ²⁷ And the artefact would incorporate ‘the reaction of the field to the error’ as new information such that ‘the machine after a period of active operation’ would ‘develop subsidiary characteristic patterns of behavior or “purposes” depending on its history’.Footnote ²⁸

MacKay's thought experiment led him to suggest ‘purely metaphorical’ comparisons between ‘artefact’ behaviour and ‘analogous manifestations in human beings’ in terms of signal, noise and ‘threshold’ responses triggered when the combination of signal and noise exceeded a certain value.Footnote ²⁹ An artefact with a high signal-to-threshold ratio that incorporated statistical noise might be like a person gaining ‘inspiration' from a ‘random thought’ which ‘leads somewhere’.Footnote ³⁰ Too little noise and high signal made an artefact predictable but without ‘imagination’; too much noise and too little signal might foster ‘distorted and hallucinatory impressions’.Footnote ³¹ The clear winner, for MacKay, was when signal was high and noise was opportunistically increased to produce ‘bright ideas’ that would be ‘followed-up in a logical fashion’ while not so high as to lead to ‘insanity’.Footnote ³² MacKay noted that this speculative exercise was a ‘totally inadequate’ description; however, he argued, it suggested that a ‘quite abstract general theory of information’ describing calculators might ‘have at least formal analogues in the mechanism of human thought’.Footnote ³³ The artefact was interesting, MacKay concluded in his report, because it encouraged us to explore ‘the science of knowledge itself’.Footnote ³⁴ The artefact might, MacKay suggested, even generate ‘original and unpredictable contributions to [a dialogue with people] in the terms and categories of human thought’.Footnote ³⁵ MacKay gave his 1949 report to Warren McCulloch during the first Ratio Club meeting, at which McCulloch was an invited guest. McCulloch subsequently circulated the report in the United States.Footnote ³⁶ (Nine years later McCulloch recalled MacKay's 1949 report as ‘[o]ne of my old treasured possessions’.Footnote ³⁷)

MacKay would earn his PhD in physics on analogue computing for solving differential equations at Kings’ College London in 1951 at the age of twenty-nine. MacKay's interest in information caught the attention of Warren Weaver, and Weaver provided MacKay with a Rockefeller Foundation scholarship to visit the US in 1951.Footnote ³⁸ MacKay spent half of the year touring the US, visiting more than 120 US labs as well as attending the eighth Macy conference in New York City.Footnote ³⁹ The other half-year was spent working in McCulloch's University of Chicago laboratory examining how information might be treated in neurology. MacKay and McCulloch developed a close friendship, despite MacKay's scepticism ‘that the brain could be plausibly thought of as a digital computer à la McCulloch–Pitts’, referencing a 1943 paper on neurons.Footnote ⁴⁰

MacKay increasingly saw his work on information theory as an empirical and philosophical exploration of human communication, originality and agency. This was exemplified in his ‘Mindlike behaviour in artefacts’, an article submitted to the British Journal for the Philosophy of Science in March 1951. Rejecting simplistic analogies between computers and brains as having ‘little merit’, MacKay saw the qualities of ‘[o]riginality, independence in opinion, and the display of preferences and prejudices’ as ‘characteristic of a human mind’.Footnote ⁴¹ He used the word ‘artefact’ in place of ‘machine’ to suspend the reader's own prejudice regarding the possibility of an artificial construct exhibiting similar creative agency.Footnote ⁴² MacKay repeated Wiener's 1948 premise that ‘goal-directed behavior’ of an artefact necessitated that artefacts receiving ‘feedback’ on itself, its activity and its environment.Footnote ⁴³ ‘Goals’ such as optimizing efficiency, maintaining equilibrium and developing ‘superficially unpredictable characteristics capable of rational description in purposive terms’ were hobby horses of cybernetics, which MacKay well knew, duly citing Ashby, Wiener, Pitts and McCulloch.Footnote ⁴⁴ Yet MacKay noted that the simplifying ‘assumption that all the data used are exact, and lead to deductions which are unique and certain’, depended on an ‘assumption that decomposition into elementary “yes-or-no” propositions is possible without distortion’.Footnote ⁴⁵ Social activities like ‘[h]uman intercourse’, MacKay noted, countermanded the latter assumption, and that ‘[d]ata are only moderately certain, and [that] the closest attainable approach to a unique conclusion is often an estimate of the relative probabilities of several’.Footnote ⁴⁶

This multiplicity of answers depended on potential hypotheses, and the credibility of these hypotheses changed given the existence of new hypotheses. An artefact's capacity to learn a ‘pattern or Gestalt’ might generate additional subjectivities useful for generating novel premises, ‘including hypotheses about its own mechanism for generating hypotheses’.Footnote ⁴⁷ Using the consequences of previous actions to update its future activity might produce tendencies in the artefact's behaviour analogous to ‘originality, independence of opinion, and, for example, illogical human characteristics as prejudice, and preference’ and ‘other “emotional” effects’.Footnote ⁴⁸ MacKay speculated that such idiosyncrasies might allow the artefact to produce creative and surprising hypotheses, and facilitate an artefact's sensible response ‘in the face of contradictory subsequent experience’.Footnote ⁴⁹

MacKay linked the subjectivity of an artefact to its capacity to perform useful abduction. This implicitly linked the value of a learning program to its capacity to respond in novel ways to unseen observations, contradictory or otherwise. Consider strategies for mechanically identifying any triangle as a triangle. MacKay attributed to McCulloch and Wiener a strategy in which an artefact identified triangles by testing candidates against a ‘template’.Footnote ⁵⁰ That this strategy invoked an ‘ideal’ meant that it might poorly handle cases not anticipated at the outset.Footnote ⁵¹ Mackay's own strategy worked via an analogy to a blindfolded person identifying triangles by running his finger along the shapes to be tested. To such a person, MacKay argued, ‘the concept of triangularity is invariably related with and can be defined by the sequence of elementary responses necessary in the act of replicating the outline of the triangle’.Footnote ⁵² ‘The elementary acts of replication’, MacKay stressed, ‘define the basic vocabulary in terms of which the artefact describes its own experience’.Footnote ⁵³

Rearranging known sequences of actions to produce novel sequences of actions, what MacKay called ‘replications’, was, by definition, abduction. Replications were effectively new hypotheses to be tried out in the world.Footnote ⁵⁴ The framing of experience and originality in terms of replications meant that any question, decision or problem framed in such terms could be examined by such artefacts. Generality was the learning of ‘hierarch[ies] of abstraction’ in which replications were ‘formed by the responses of each level [of abstraction] becom[ing] the subject matter of the response-vocabulary of the next higher [level]’.Footnote ⁵⁵ The replications composed of sequences of actions useful for one context – say, identifying a letter on a page – became the vocabulary of useful actions for composing new sequences at a higher level of abstraction – such as parsing the grammar of a sentence.

Cognizant that building up replications across different scales and contexts would produce paradoxes, MacKay drew on a paradox with which he was intimately well acquainted: wave–particle duality.Footnote ⁵⁶ Such a paradox, he wrote, was ‘resolved neither by arbitrary denials of “reality” nor by “explanations” of one as “nothing but” an aspect of the other’, but by deciding ‘the appropriateness of a description’ for ‘any given situation’.Footnote ⁵⁷ Multiple ‘descriptions’ could be ‘valid’, he argued, but ‘[p]aradoxes arise when concepts defined for one logical background are mixed carelessly with those defined for another’.Footnote ⁵⁸ These ‘logical backgrounds’, for MacKay, were the ‘organization of action in the world’ that a particular artefact built up through experience and that interwove the conditions of possibility for originality, creativity and generality.Footnote ⁵⁹

That MacKay's ‘originality’ entailed a radically constructivist epistemology can be seen in how MacKay thought a person's or an artefact's capacity to recognize originality was itself contingent on individual experience. What might appear to one person as another person's meaningless activity – what MacKay calls ‘the “completely random component” of the human behaviour pattern from the observer's point of view’ – may be seen ‘as the exercise of free choice’ when viewed from the perspective of the doer of that activity.Footnote ⁶⁰ Actions appearing as random or devoid of meaning to one artefact may be of primary importance to another artefact as a consequence of the differences in each artefact's repertoires of replications. Such perspectivalism meant that an artefact's originality was predicated on its past experiences. Such an artefact would be deeply fallible, as people too were fallible. Two artefacts trained on the same data could develop different (but perhaps) complementary worlds through their respective ‘experiences’ of those data.

The very thing that gave an artefact the ability to learn new things, to learn in redundantly different ways and to handle contradictory inputs was also precisely what guaranteed that an artefact could not be objective. And it was precisely the artefact's subjectivity that gave it the potential to act efficaciously in ill-defined or poorly understood systems. By the same light, the activities of an artefact could not be considered apart ‘from its environment, when the concepts of interest are essentially properties of the system-plus-environment’.Footnote ⁶¹ Properties of ‘minds’ were exactly of this sort such that the ‘system-plus-environment’ included ‘conceptual frames of reference, defined respectively from the viewpoint of the actor and spectator’ where ‘[d]escriptions in terms of only one group or the other may both be valid’.Footnote ⁶² This descriptive relativism pertaining to perspective also included an exchangeability between the artefact's repertoires of ‘abstractions’ and the artefact's input data: both could be ‘exemplified by replication-operations of one kind or another’.Footnote ⁶³ Such artefacts could have ‘analogues of concepts such as emotion, judgment, originality, consciousness, and self-consciousness’.Footnote ⁶⁴ Yet what appears to have been even more exciting to MacKay than simulating ‘consciousness’ was that his artefact might inductively and abductively formulate ‘hypotheses about its own mechanism for generating hypotheses’.Footnote ⁶⁵ This would soon be explored in a learning program for the Electronic Delay Storage Automatic Calculator (EDSAC) written by a new college graduate named Anthony Oettinger.

Generality as an efficacious response to novelty

Anthony Oettinger visited the University of Cambridge's Mathematical Laboratory as a Henry fellow during a gap year between pursuing his undergraduate and doctoral degrees at Harvard in applied physics and applied mathematics respectively. By 16 October 1951, Maurice Wilkes, in his capacity as Oettinger's supervisor at Cambridge's Mathematical Laboratory, introduced Oettinger to Alan Turing's ‘Computing machinery and intelligence’ (1950), which Oettinger described as ‘funny as hell in parts’ and posing ‘a rather interesting problem’.Footnote ⁶⁶ Between attending Bach concerts, sitting in on Paul Dirac's quantum mechanics course, and staying up nights to execute programs on the EDSAC, Oettinger wanted ‘to get at some general principles’ pertaining to a ‘machine simulat[ing] a learning process’ in order ‘to determine whether it is possible to give the machine more freedom, without getting sheer nonsense out of it’.Footnote ⁶⁷ Frequently working from 10 a.m. to midnight in the lab and reading about ‘learning’ in ‘bio[logy], psych[ology], phil[osophy], and math’, Oettinger's efforts culminated in ‘Programming a digital computer to learn’ (1952), which discussed his implementation of two learning programs on a digital computer.Footnote ⁶⁸ Oettinger argued that the first program, which he called the ‘shopping programme’ or ‘s-machine’, would pass a restricted version of Turing's ‘imitation game’ involving one question: ‘In what shop may article j be found?’Footnote ⁶⁹ However, such a constrained version of the test, Oettinger contended, highlighted the shopping program's ‘limitations’ as a less ‘general programme’.Footnote ⁷⁰ The program, barring computer-mechanical error, did exactly what it was instructed so that its ‘range of operation [was] consequently limited’.Footnote ⁷¹

Oettinger's more general solution was a second program he called the ‘response-learning s-machine’ that could learn new tasks through ‘trial and error’, to which he devoted the bulk of his 1952 article.Footnote ⁷² The response-learning program developed a particular ‘response’, what he called ‘a habit’, to particular repeated inputs.Footnote ⁷³ The program wasn't told what task to perform or how to perform a task. Learning generalizability was what made a program better, and this quality was not defined by its performance at any specific task but by its ability to do what it wasn't told. Response-learning programs were to be judged by a different set of standards since external observation of a program's behaviour was inadequate.Footnote ⁷⁴ A ‘general’ learning program's behaviour had the status of an experiment: patterns could be proven false but never true. To evaluate his response-learning program's habits he compared them to ‘conditioned reflexes’.Footnote ⁷⁵ The program accepted inputs (i.e. a number) and returned outputs (i.e. another number) that changed based on repeated approvals and disapprovals (i.e. a third number) that a person provided the program in response to the appropriateness of its outputs. The program could even learn some habitual responses from input stimuli even when no person-guided training was performed. Oettinger explored this behavior ‘from the privileged point of view of the designer’ by providing the system of equations that governed the response-learning behavior, including (1) changing ‘threshold’ states driven by ‘random fluctuations’ that triggered different responses, and (2) a memory ‘decay’ function in which learned habits were slowly forgotten.Footnote ⁷⁶ These two features, Oettinger argued, facilitated more general learning.

The virtue of the response-learning program was in the program's capacity to learn new (i.e. not predetermined by the programmer) responses that might exceed the abilities or understanding of the programmer. Using ‘[random] fluctuations the machine can make mistakes’, but, Oettinger noted, ‘[t]his makes possible the teaching of a new response, or, when no response is favoured over the others, produces an interesting variety of responses’.Footnote ⁷⁷ Oettinger noted that the decay ‘introduces some lethargy into the behaviour of the machine, by causing all [threshold states] to drop [slowly over time], hence requiring ever increasing stimuli’, effectively giving the learning program a short-term memory and the ability to forget.Footnote ⁷⁸ This combination of ‘random fluctuations’ and forgetfulness made it possible for the program to exhibit ‘decay or habit formation, or the steady state of frequent or varied responses’.Footnote ⁷⁹ Producing valuable responses was not just a strategy of cultivating ever greater menageries of heterodox responses to data and seeing which worked. A complete model of the world was neither required nor desired, nor perhaps even possible. But a machine that learned directly from its environment, however limited, could develop ‘habits’ to do useful tasks.

These programs, Oettinger argued, might also serve as ‘elementary building block[s] for a wide variety of more sophisticated systems’ such that ‘some [programs] serve as stimuli for others’ to collectively perform more complex tasks.Footnote ⁸⁰ For Oettinger, such collections of learning programs might learn how to do a task without being told how to do it. By invoking a whole repertoire of simple response-learning programs capable of developing habits that interdependently fed inputs and outputs to each other, Oettinger was suggesting not just that learning was a strategy for developing complex behaviors (think ‘shopping’), but, more importantly, that learning was a way of acclimating machine actions to handle contextual ambiguity and human categories.

That Oettinger's program echoed some of the ideas we have seen in MacKay's 1951 paper – especially pertaining to the uses of signal, memory and decay, habit formation, and noise to generate more complex behaviors in learning programs – is no coincidence. Oettinger writes of attending a Ratio Club meeting on 8 February 1952, in which he notes that Turing would present a paper and W. Grey Walter and D.M. MacKay would be hosts.Footnote ⁸¹ Ten days later, at precisely the time when Oettinger and Wilkes were revising Oettinger's article, Oettinger visited MacKay at King's College, reporting that MacKay was ‘very much interested in the same ideas as I, and we had a good time’.Footnote ⁸² Oettinger would attend the Ratio Club again, but his disposition towards his own learning program grew more vexed throughout the spring as the EDSAC frequently broke down and Wilkes urged new rewrites of his paper. Much worse, Oettinger wrote, was that ‘the man I most wanted to talk to, as he'd done a good deal of work on this thinking business’, Alan Turing, ‘had to plead guilty to charges of “gross indecency” with another man as a result of some blackmail’.Footnote ⁸³ After many revisions, Wilkes gave his approval for Oettinger to submit his paper for publication by 27 May 1952, with Oettinger writing that his final version was ‘somewhat pessimistic’ and that ‘I had hoped for better results’.Footnote ⁸⁴ His response-learning program associated certain numerical inputs with other numerical outputs – but this was hardly shopping.

Machine learning as the production of completely new ideas not deducible from known data

Andrew and Kathleen Booth's 1953 discussion of ‘machine learning’ appears to take their examples without attribution from Oettinger's work just discussed.Footnote ⁸⁵ Having already built multiple digital computers at Birkbeck College, University of London – often by cannibalizing earlier computers for parts to make subsequent ones – Andrew and Kathleen Booth documented their efforts in a 1953 textbook entitled Automatic Digital Calculators.Footnote ⁸⁶ Apologizing at the outset for the use of ‘anthropomorphic term[s]’, their use of ‘machine learning’ in the concluding chapter pre-dates by more than two years John McCarthy's introduction of ‘artificial intelligence’ in McCarthy's co-authored Dartmouth workshop proposal.Footnote ⁸⁷ The Booths’ linguistic choice was less rooted in aspirations of giant mechanical brains, androids or reproducing human intelligence, but, like MacKay, in the complications entailed by the switch from ‘analogue’ to ‘digital’ computers.

Digital computers were too fast. Analogue computers, as we have seen in discussing MacKay, were limited in the numerical precision they could provide because they represented numbers via material analogies.Footnote ⁸⁸ Even a numerical error of less than one in a hundred, the Booths noted, was difficult to achieve. In contrast, digital computers could be ‘arbitrarily’ precise given appropriate implementation such that ‘one in ten million’ was not unthinkable.Footnote ⁸⁹ This precision was necessary to solve problems that required many repetitive calculations. Rounding up or down the last digit of thousands of calculated numbers quickly led to an accumulated numerical error that could dwarf the computed value, rendering the entire calculation useless.Footnote ⁹⁰ Since the potential precision of automatic digital calculators made it feasible to perform iterative calculations using previously computed values, the Booths noted that the bottleneck in the speed of digital computers was often the time it took for humans to interact with the machine.Footnote ⁹¹

Six years earlier, they had argued that rather than waiting for human input, a digital computer could be ordered to make ‘judgements’ using the results it had computed from input data. Their incisive summary of the state of computing in the US and the UK was submitted for publication after visiting the Institute of Advanced Study at Princeton from March to August 1947.Footnote ⁹² Defining the ‘translating of a problem in terms of the available functions of the machine … as programming’, the Booths contended that a ‘programme’ was ‘capable of controlling its own operations and exerting a certain amount of independent judgement’.Footnote ⁹³ This was necessary because ‘human agencies [were] too slow to control machines which are much faster than those already in use’.Footnote ⁹⁴ For the Booths, the machine ‘judgement’ constituted by the computer's ability to take different actions in response to its calculations (using input data and criteria specified at the outset by the human operator) already constituted a form of learning.

Their extensive mechanical knowledge and mathematical acumen meant that few were better prepared to equip digital computers with such ‘judgement’ than the Booths. Andrew's father had trained Andrew to be comfortable doing calculus by the age of ten. By the time he earned his PhD in physics from the University of Birmingham in 1943, Andrew had built three analogue computers for X-ray crystallographic work, something that brought him to the US in 1946.Footnote ⁹⁵ Kathleen earned her PhD in applied mathematics from the University of London in 1950, focusing on supersonic aerodynamics. Alongside Zenia Sweeting, she was responsible for the bulk of the construction of a computer that the Booths and Sweeting co-created for the British Rubber Producer's Research Association prior to the Booths’ Princeton trip in 1947.Footnote ⁹⁶

While the bulk of the Booths’ 1953 Automatic Digital Calculators provided the reader with a mechanical description of the components of a digital computer and theoretical description of some relevant computational methods, its concluding section discusses applied problems. After the mathematical problem of X-ray crystallography, the remaining three applications of ‘mechanical translation’ (of science articles), ‘games’ (e.g. cards, noughts and crosses and chess) and finally ‘machine learning’ were all ‘non-numerical’. ‘Machine learning’, they wrote, was of at least two kinds.Footnote ⁹⁷ The first was analogous to teaching a dog through reward and punishment. The learner remains unaware of the teacher's objectives. The second involved goal-oriented learning; that is, specifying a goal and how to achieve it, which the Booths compared to teaching ‘partially educated’ children specific tasks like multiplication, reading poetry or playing the piano.Footnote ⁹⁸

This second kind of learning facilitated faster computation, analogous to the 1947 version of computer ‘judgement’ discussed earlier. It involved a computer program that remembered the outcomes of earlier actions and inputs. It essentially ‘learned’ by updating its information given inputs, reconfiguring its actions according to different numerical or logical conditions defined by the programmer. Being goal-directed meant that the programmer could state the conditions the program could use to determine whether the program had achieved its goal. The specific program the Booths provided to illustrate this type of learning was a ‘shopping’ program, detailed in the form of (1) a diagrammed sketch, (2) a series of program orders and (3) an inventory of memory addresses and contents. The program attempted to obtain specific papers at different simulated shops, both represented in memory by numerical codes, by following a given algorithm and by remembering which articles were at which store.Footnote ⁹⁹ The shopping program adjusted its actions by remembering which stores did or did not have articles, avoiding or frequenting them as appropriate when retrieving future articles.

In contrast, the Booths’ called the first kind of learning they discussed ‘conditioned reflex’, much as Oettinger had done.Footnote ¹⁰⁰ And like Oettinger's response-learning program, the Booths’ program was trained through a series of interactions with its environment and a corresponding series of ‘encouragement[s]’ and ‘punishment[s]’ provided by a trainer (i.e. a mathematical function or a human operator) after each interaction, until the program produces a desired performance.Footnote ¹⁰¹ Such a process, the Booths argued, could teach a program that initially outputs a string of random numbers to output π.Footnote ¹⁰² But the point was to produce a repertory of ‘genuine learning programmes inside the machine so that its memory faculty and elementary reasoning powers (e.g., shopping) could effectively be used to speed up its education’ and that this might ‘constitute a valid reason for asserting that a machine can learn from experience’.Footnote ¹⁰³

The Booths did not restrict intellectual activity to logical operations. They noted that ‘intelligence’ was ‘a matter of taste, since intelligence would mean two entirely different things to, say, a dock labourer and a university professor’.Footnote ¹⁰⁴ Definitions of intelligence, they hinted, provided little insight and missed the point. They instead prefered ‘to define relative intelligence by relative capacity for creative work’ via either (1) the ‘[d]eduction of new conclusions from existing facts’ or (2) the ‘[p]roduction of completely new ideas not deducible from known data’.Footnote ¹⁰⁵ The latter form of creative activity, they suggested, was ‘extremely rare’ and ‘a result of random processes’, but had the potential to identify ‘a new law of nature’ for the machine's ‘human ancillaries’ to investigate.Footnote ¹⁰⁶ For a machine to be ‘creative’, the Booths implied, you must allow the machine to redefine the form of the answer you expect, just as you would any person. A human ‘genius’, they argued, might consider the statement ‘the moon is made of green cheese’, and not merely either accept or reject the claim, but ‘consider it in detail and thus possibly discover a fundamental natural law’.Footnote ¹⁰⁷ Implicit in their concluding example was that a creative act involved speculative inference, and an appropriate inference machine could ascertain or redefine the appropriate scope of relevance directly from its input data and its interactions with its environment. Their machine learning was not just another version of naive behaviourism. Rather, the Booths were pre-emptively and unknowingly flipping the script of much future 1950s and 1960s AI work: instead of employing limitations of scope as a necessary evil to make an AI system pragmatically usable, machine learning could turn the inability to specify the scope of a problem into an epistemological virtue by defining the relevant scope as whatever caused the machine to generate acceptable answers in test cases.

The Booths’ use of ‘machine learning’ as a term of art prior to McCarthy's popularization of the term ‘artificial intelligence’ contradicts the contemporary understanding of machine learning as a sub-field of artificial intelligence, pointedly suggesting that there were other traditions of learning machines not tied to the commitments and values of early AI that privileged human imitation. The Booths’ 1953 discussion suggests that a distinct form of learning-machine epistemology was already well established specifically to address problems for which multiple ‘correct’ answers might be permissible. This approach relied on the available data to define the appropriate scope of the phenomena of interest, and did not require a definition of the objects of inquiry but just the specification of relevant data to the inquiry. The ability to not specify the object of inquiry encouraged a different form of answer to social problems that emphasized continuity with the past while allowing a computational system to intervene in the present.

Epilogues and new directions: meritorious descriptions of the political and social world

Oettinger's subsequent doctoral work after returning to Harvard was on machine translation, ‘automatic data processing’ and computer design and logic. He went on to be the youngest professor to get tenure at Harvard at that time. The Booths pursued similar research subjects throughout the 1950s. Andrew's efforts on machine translation were already well known by 1953 and Kathleen apparently worked on neural networks for character recognition in 1958 or 1959.Footnote ¹⁰⁸ They continued to build a variety of commercially funded computers. MacKay's questions about representation led him away from information theory and towards philosophical- and physiology-inflected studies of perception, communication, choice and free will. For each researcher considered here, their work on learning programs was professionally transitory but intellectually generative. They are all better known today for what they did after 1953.

Yet their conceptions of learning as the capacity to respond appropriately to unexpected or contradictory new data by generating interpretations that might complement, surprise or challenge human interpretations informed and even defined what a valuable problem was in pattern recognition for the next three decades.Footnote ¹⁰⁹ It would inform the possibilities for ‘machine learning’ in its rebranding as a sub-field of artificial intelligence in the late 1980s.Footnote ¹¹⁰ As the tasks of both interpreting identical patterns of data in different ways and recognizing different configurations of data as categorically identical were seen as different incarnations of induction, their implementation of induction in learning programs led 1950s pattern recognition researchers to conceive of ‘creativity’ as the generation of new hypotheses (i.e. abduction) to perform induction.Footnote ¹¹¹ Rather than centring themselves as experts, as AI researchers often did, they foregrounded their own ignorance of the tasks they would have their machines perform in the hopes those machines might ‘learn’ to do something the researchers themselves did not know how to do. Having more data regardless of its provenance was not in the service of more accurate or faster prediction, but instead was motivated by a particular conception of generality as a machine's (and human's) capacity to respond in robust, relevant or even creative ways to what was not and could not be predicted.

Crucially, what a problem situation entailed for pattern recognition researchers was very different to what it entailed for the emulating-experts approach of artificial-intelligence research. Lots of data might provide an inventory of exceptions that a learning program might memorize for classifying future ‘edge’ cases – but better accuracy alone missed the point. Lots of data were more valuable because they facilitated induction. Mechanized induction could be performed by a learning program if ‘knowledge’ itself was the program's actions and the effects of these actions. In this way, for these researchers, the technical classifications performed by learning programs mirrored the inductive and abductive process of discovery by a person – including how one conducted a scientific investigation. Early machine learning is a particularly fruitful ground for reimagining the intertwined practices of computation and quantification in the twentieth century, and the new possibilities for ‘making people up’ in the twenty-first century.Footnote ¹¹²

Early AI and early ‘machine-learning’ researchers’ disagreements were less about the efficacy of one or another approach and more about the values and forms of knowledge that these approaches were seen as being capable of facilitating. Those working in AI, pattern recognition and cybernetics in the 1950s attended many of the same conferences and workshops, and read each others’ publications, all while advocating for radically different technical practices and methodologies that belied different visions of self and society, and different possibilities pertaining to how each could be known. For example, Hunter Heyck, Stephanie Dick and Jonnie Penn have each examined how the Logic Theory (LT) Machine program reformulated mathematical proof proving as a deductive problem implemented on a digital computer that later came to be seen as an exemplar of AI research.Footnote ¹¹³ Simon's conception of ‘bounded rationality’ and the LT program engaged in the dual premise (1) that there was only one rational ‘course of action’ given all relevant information and values for a situation, and (2) that no person could consider all relevant information pertaining to a complex rational decision.Footnote ¹¹⁴ This view had political consequences. Simon saw organizations and institutions as the means by which individual subjectivity could be overcome through a kind of collective rationality – such rationality of collectives aligned with Simon's democratic ideals even as it de-emphasized individual agency.Footnote ¹¹⁵ It also led Simon to seek out problems which, as Heyck writes, ‘could be described unambiguously’, like chess and proof proving, which were formulated deductively, and, as Dick observes, led Simon to understand computers, human minds and organizations as instantiations of information processing.Footnote ¹¹⁶

The early machine-learning researchers examined here came to information theory as a solution for reimagining what the world was and for escaping their own myopia. Their work on computers focused explicitly on ambiguous situations and poorly defined tasks that led them to see the problem of significance as a problem of nominalism, and that all other problems could be reimagined as problems of nominalism. The early machine-learning researchers I examine frequently had to draw upon a plurality of correct solutions, saw objective rationality as a special limiting case of subjectivity, and saw efficacious induction as facilitated by ‘creativity’ – where creativity itself was abduction that tacitly incorporated human values and commitments from examples. The contrasting positions of early machine-learning researchers and early AI researchers reflected different political and epistemological commitments, and yet these differences were articulated and clarified through debates about ‘learning’ that brought AI and machine-learning researchers into frequent and constructive contact despite their profound disagreements about the meaning and interpretations of their work.

To explain how learning programs came to be seen as offering credible descriptions of society and self – indeed if we want to understand the prominent role of machine learning in descriptions of society – we cannot resort to detailing sub-communities building different learning programs as if these efforts were used to compel the agreement of many other sub-communities. We instead need to understand how learning as a trading zone limited the forms of exchange and possibility across sub-communities. The LT program became a solution and a kind of evidence for realizing objectivity through institutions for Simon. For MacKay a learning program was a solution and a kind of evidence for recognizing what was significant to a task given a plurality of descriptions. MacKay, and the niche community of ‘machine-learning’ researchers in pattern recognition that he exemplifies, developed a nominalist-inflected vision of creativity through their efforts to implement learning programs on electronic computers, and linked their technical practices to larger political commitments. More broadly, the early histories of machine learning reframe the role of induction in twentieth-century sciences, and suggest that forms of social description and individual identity were often circulated and made durable because of a disunity of computing communities. Our histories of AI and machine learning have only begun to reflect this insight.