2. Wittgenstein's Therapeutic Conception of Philosophy

The reading that follows relies on Wittgenstein's later, therapeutic conception of philosophy, as I understand it. This ‘conception’ is not a theory or description of all the things we might happen to call ‘philosophy’, but Wittgenstein's own radical conception of how philosophy should be done – ‘radical’ in that it disrupts the traditional philosophical mode of treating certain questions either as innocent and answering them directly by way of an account, definition, or theory; or as guilty (e.g., unanswerable or confused) and showing that this is so via some theory of language or cognition (and their necessary limits).Footnote ⁶ By contrast, on Wittgenstein's conception of philosophy, philosophical questions are themselves an object of suspicion and require an investigation of their sources without any aspiration to theory (Wittgenstein, Reference Wittgenstein, Hacker, Schulte, Anscombe, Hacker and Schulte2009, §§255, 109). They are treated ‘like an illness’ and thus submitted to diagnosis and therapy (ibid., §§255, 133). Since these characterizations are intended to be analogical or metaphorical (‘The philosopher treats a question like an illness’ (ibid., §255, my emphasis); ‘there are indeed methods, different therapies, as it were’ (ibid., §133, my emphasis)), I unpack them as follows.Footnote ⁷ Wittgenstein's general ‘diagnosis’ of philosophical problems is that they stem from misunderstandings about the uses of words due to one's lacking a proper overview (übersicht) of our language (ibid., §§110, 111, 122). One major aspect of language that encourages such misunderstandings is the apparent similarity between different kinds of words (ibid., §11); confusions arise when they are assimilated despite important differences between their uses (ibid., §§90, 112; Wittgenstein, Reference Wittgenstein, Luckhardt and Aue2005, pp. 302–3). Such confusion often yields misbegotten ‘pictures’ of the meanings of those words (Wittgenstein, Reference Wittgenstein, Hacker, Schulte, Anscombe, Hacker and Schulte2009, §§1, 115), which take hold of the philosopher's imagination and are effectively counteracted with reminders about how those words are ordinarily used (ibid., §§116, 126, 127).

Wittgenstein's ‘diagnosis’ of philosophical questions is at the core of his notion of philosophical ‘therapy’. The misunderstandings about language that give rise to philosophical puzzlement can only be counteracted by describing the uses of words and drawing out differences between them (ibid., §§69, 75, 109) – differences that might easily be overlooked due to their surface similarities. A common tool in Wittgenstein's philosophical therapy is his use of language-games (ibid., §130). The value of language-games (especially those that are fictional) is to serve as ‘objects of comparison’, designed to throw light on features of our actual language (ibid.). Language-games, whether actual or fictional, also articulate a kind of ideal (an ‘overview’ (übersicht), the lack of which, according to Wittgenstein, is the major source of misunderstandings), because when language-games are described in sufficient detail traditional philosophical problems about meaning do not arise (ibid., §§1, 126). Thus, generally speaking, philosophical ‘illnesses’ are confusions about the uses of words due to a lack of oversight (übersicht); philosophical ‘therapy’ counteracts such confusions by careful description of and attention to ordinary word-use, deploying (sometimes fictional) language-games to highlight aspects of use or features of our language that might otherwise be ignored.

This is Wittgenstein's therapeutic conception of philosophy in a nutshell, the further clarification of which (by his own lights) must be ‘demonstrated by examples’ (ibid., §133). The application of Wittgenstein's therapeutic method articulated throughout this paper will serve as one such example.

3. Hardy's Picture: The Basic Therapeutic Strategy

With Wittgenstein's later, therapeutic conception of philosophy to hand, I will now provide a reading of Wittgenstein on mathematical ‘truth’, as revealed in his engagement with Hardy's (and by extension Benacerraf's) picture of mathematical reality. According to Hardy's picture, mathematical truth is ‘in some sense’ part of objective reality. Such truths are immutable, unconditionally valid, and independent of our knowledge of them. The true theorems of mathematics are, ‘however elusive and sophisticated that sense may be’, genuine objects of discovery and not mere creations of our minds. At a later stage of his paper, ‘Mathematical Proof’, Hardy elaborates on his understanding of mathematical discovery with an analogy:

Hardy's picture of mathematical discovery is thus strongly analogized to the observation and discovery of peaks in a mountain range, some of which can be seen more or less clearly than others. Mathematical reality, according to Hardy, is akin to a mountain range, there to be discovered quite independently of anything we might have to say or think about it.

Versions of Hardy's picture have surfaced in a number of different places. For instance, Hardy's thoughts are reminiscent of Russell's passing remark that logic is akin to zoology:

Despite important differences between Hardy's and Russell's understandings of logic and mathematics,Footnote ⁹ they overlap in thinking of their fields as areas of discovery, concerning reality much like the geological reality observed by someone studying mountain peaks, or the biological reality studied by zoologists. Such a conception of mathematical discovery is akin to Frege's remark that ‘the mathematician cannot create things at will, any more than the geographer can’ (Frege, Reference Frege and Austin1980, p. 108), which likewise analogizes mathematics to the (empirical) science of geography.Footnote ¹⁰ Another famous instance is from Gödel, who likewise conceives of mathematics as an independent reality that ‘clearly [does] not belong to the physical world’; one which, on Gödel's view, is accessed via something like perception (thus quite reminiscent of the ‘seeing’ of mountain peaks in Hardy's image above).

Hardy's picture of mathematical reality is also clearly echoed more recently by the mathematical physicist, mathematician, and philosopher of science, Roger Penrose:

The idea that mathematics concerns an external reality that is only partially revealed to us is very much in keeping with Hardy's suggestions, e.g., that ‘There are some peaks which [a mathematician] can distinguish easily, while others are less clear’. The examples of Hardy, Russell, Frege, Gödel, and Penrose suffice to show that a suggestive picture of mathematical reality articulated (however roughly) by Hardy has attracted serious mathematicians and philosophers alike. I will not assume that their full-fledged views or theories of mathematical reality (to the extent that each has one) are all the same (indeed, they are not) – what is important for our purposes is a common picture at the root of each: that of a reality which is ‘out there’ independently of mathematical practice and discovered by mathematicians in the process of doing mathematics, akin to the independent realities studied by geologists, geographers, zoologists, or physicists.Footnote ¹¹

As we saw earlier, Hardy's picture is likewise echoed in Benacerraf's famous paper, ‘Mathematical Truth’: that of an independent reality of entities akin to empirical objects (e.g., cities), but quite different in that they are a-causal and abstract. Although Benacerraf provides a more technical argument for this picture than Hardy, they both proceed by analogizing the truths of mathematics to empirical truths (e.g., those having to do with mountain peaks or cities).

What does Wittgenstein have to say about these pictures of mathematical reality? According to his therapeutic conception of philosophy, we should investigate the sources of Hardy's and Benacerraf's pictures as well as the philosophical questions and puzzlement they engender. The puzzlement here includes questions (more or less standard in the philosophy of mathematics) such as, ‘What is mathematical reality?’, ‘How is mathematical knowledge possible?’, ‘How can we make sense of the application of mathematical truths (which seem to inhabit their own kind of reality) to empirical reality?’, among others. Since questions of this sort themselves hinge on a certain picture of mathematical reality – i.e., as something hanging out there, though perhaps beyond the causal realm – the main focus for Wittgenstein should be that very picture.Footnote ¹²

Where does this picture come from? More specifically, what is it about our language that has encouraged such a picture? Given the presentations offered by Hardy and Benacerraf, we thankfully don't have to look far and wide for an answer. The obvious source for Wittgenstein would be the assimilation of mathematical truths (or, propositions) to empirical truths (or, propositions), an assimilation that both authors make explicitly, albeit without much reflection or scrutiny. As we saw in section 2, Wittgenstein thinks that the assimilation of apparently similar expressions is a general source of philosophical confusion. A therapeutic response will go by way of studying the uses of these expressions so as to draw out their crucial differences. Studying the differences should, in turn, undermine the hasty analogy that led to Hardy's and Benacerraf's pictures of mathematical reality and thus the questions they engender.

We can see that this is the very approach Wittgenstein is reported to have taken up in his lectures – which provide the most explicit engagement with Hardy's picture of mathematical reality.Footnote ¹³

4. Wittgenstein's Discussion of Hardy in Lecture XXV

At the beginning of Lectures on the Foundations of Mathematics XXV, Wittgenstein reportedlyFootnote ¹⁴ addresses ‘a false idea of the role which mathematical and logical propositions play’ (Wittgenstein, Reference Wittgenstein and Diamond1976, p. 239). He illustrates this false idea by examining Hardy's remark that ‘to mathematical propositions there corresponds—in some sense, however sophisticated—a reality’, though he emphasizes that Hardy's saying this is not crucial, since ‘it is a thing which lots of people would like to say’ (ibid.) – as we ourselves saw with the selection of philosophers and mathematicians in section 3. Wittgenstein immediately complains that ‘Taken literally, this seems to mean nothing at all—what reality?’ (ibid.). Although he claims not to understand Hardy's remark, he notes that ‘it is obvious what Hardy compares mathematical propositions with: namely physics’ (ibid.). This is also something we have seen confirmed above in the cases of Hardy, Russell, Frege, Gödel, Penrose, and Benacerraf – all of whom analogize the truths of mathematics to the truths of some empirical domain or other (e.g., geology, zoology, physics, or geography). But whereas the analogy, on their view, suffices to explain what they mean by an ‘independent mathematical reality’, Wittgenstein insists that this produces a muddle.

Why does the analogy fail to clarify what is meant by ‘to mathematical propositions there corresponds a mathematical reality’? The major objection raised by Wittgenstein is that Hardy extrapolates a bewildering picture from ‘a mere truism’, namely, that ‘Mathematical propositions can be true or false’ (ibid., p. 239). But, according to Wittgenstein, this is just to say ‘that we affirm some mathematical propositions and deny others’ (ibid.). We could paraphrase ‘It is true …’ by ‘A reality corresponds to …’, but this is just to replace one set of words with another, which in turn can only state the obvious if it states anything at all: ‘that we affirm some mathematical propositions and deny others’ (ibid.). Of course, it's also true that ‘We […] affirm and deny propositions about physical objects. — But this is plainly not Hardy's point’ (ibid.). That is, again, Hardy extracts an exotic picture from a trivial and obvious fact: that we affirm and deny both mathematical and empirical propositions. If Hardy were merely stating this trivial and obvious fact, ‘it would come to saying nothing at all, a mere truism’, that is, ‘if we leave out the question of how it corresponds, or in what sense it corresponds’ (ibid.).

In other words, the mere fact that we say of both mathematical and empirical propositions that they are true (or false) does not imply anything about a special mathematical reality to which mathematical propositions correspond. To think otherwise would be a hasty and unjustified leap from (i) a superficial similarity between these kinds of expressions (that they can both be ‘true’ or ‘false’, or that we affirm and deny both) to (ii) a problematic metaphysical picture. That is, if one thinks on the basis of these superficial similarities that mathematical propositions correspond to reality in exactly the same way that empirical propositions do, then this encourages a highly misleading picture of mathematics – that of mathematics corresponding to a reality somehow analogous to a mountain range, the animal kingdom, or particles in a cloud chamber. This would be akin to inferring from the analogy (i) ‘reading a book is like riding a bike’ (i.e., if you've learned once before, it's easy to pick back up), that therefore (ii) reading a book is exactly like riding a bike: it requires pedalling, shifting gears, and wearing a helmet. One similarity between A and B does not imply total similarity between A and B – a truism about analogy that, if forgotten, can lead to philosophical confusion.

Thus, according to Wittgenstein, Hardy has been taken in by a misleading analogy, itself encouraged by a trivial and superficial similarity between mathematical and empirical propositions. Such an analogy leads to a problematic picture of mathematical reality (i.e., as something ‘out there’ yet beyond our causal reach) by overlooking all of the crucial differences between the uses of mathematical and empirical propositions.

Consider, for instance, that one could have proceeded in the opposite direction: mathematical and empirical propositions have quite different uses, including the conditions under which we take them to be ‘true’, ‘known’, ‘believed’, etc.; therefore, mathematical propositions do not concern or correspond to reality in anything like the way empirical propositions do. Wittgenstein's stance (if we can call it that) is somewhere between Hardy's direction of thought and its opposite. That is, there are crucial differences between mathematical and empirical propositions, though there are also similarities (however superficial they might be). The trick is not to get seduced – either by their differences or similarities – into a misleading picture of their roles or meanings (Wittgenstein, Reference Wittgenstein and Diamond1976, p. 15).Footnote ¹⁵ Wittgenstein's tasks are thus (a) to display and ‘diagnose’ this leap in thought from superficial similarities among different kinds of ‘propositions’ to Hardy's picture of mathematical reality, as well as (b) to draw our attention to the differences between mathematical and empirical truths (or, propositions) in order to counteract the hold of this misleading picture.

Wittgenstein provides a diagnosis (‘a thing which constantly happens’) immediately after the foregoing passages.

Thus, as we saw before, Hardy is misled by a comparison between mathematical and empirical propositions (or, ‘propositions of physics’). The comparison is misleading because it haphazardly generalizes from the features of one use of ‘a reality corresponds to’ to all uses of this expression, viz., from the use of that phrase as applied to empirical propositions to its use as applied to mathematical propositions. Propositions like ‘There are at least three cities larger than New York’, ‘There is a small chair in the living room’, or ‘The Sun is approximately 94.389 million miles away from the Earth’ (which are themselves quite different from one another!) might be the most common and natural instances when we think of a reality (e.g., cities, chairs, the sun) corresponding to a proposition, but it would be a mistake to generalize all of their features to a proposition like ‘There are at least three perfect numbers greater than 17’ and assume that it ‘corresponds to reality’ in exactly the same way as the others.

Wittgenstein notes that in the most common or natural cases, we think of ‘reality’ as ‘something we can point to’, ‘It is this, that’. For instance, if I say, ‘There is a small chair in the living room’, and someone expresses doubts about this, we can walk to the living room together and I can point at the small chair, ‘Aha! See! I was right’. If there are doubts about whether ‘There are at least three perfect numbersFootnote ¹⁶ greater than 17’, then we need to perform some calculations (e.g., we might check one at a time the numbers greater than 17 to see whether any is a perfect number – which would take quite some time as the next in line after 6 are 28, 496, and 8,128! – more plausibly we'd verify by relying on someone else's work, as I did). I might ‘point’ to the results of our calculations, but this is not much like walking into a room and pointing at a chair – nor is it like, as Hardy suggests, looking at a distant mountain peak and pointing to it. To think otherwise would amount to being misled by the uniform appearance of the word ‘pointing’ across quite different uses – i.e., to mistakenly assume that its use in the mathematical case is exactly like its use in the empirical case because the word ‘pointing’ is used both times.

Wittgenstein repeatedly emphasizes elsewhere in the lectures that mathematical propositions often function as rules governing our descriptions of empirical reality, and are thus also for this reason importantly different from empirical propositions themselves (Wittgenstein Reference Wittgenstein and Diamond1976, pp. 33, 44, 82, 98, 112, 246, 256, 292; see also Wittgenstein, Reference Wittgenstein, von Wright, Rhees and Anscombe1978, pp. 363, 324, 98–99). For instance, if we say ‘there are (only) 7 apples in this box’ (an empirical proposition), then the truth of this is sensitive to what we find in the box. If we find that there are 8 apples in the box, we will reject the initial claim that there are (only) 7. By contrast, if we say ‘if there are (only) 4 apples in Box A and (only) 3 apples in Box B, then there are (only) 7 apples in Boxes A & B’ (i.e., 4 apples + 3 apples = 7 apples), then this stands as a fixed rule for intelligibly describing the situation, rather than being vulnerable to any ‘findings’ that might otherwise appear to controvert it (Wittgenstein, Reference Wittgenstein and Diamond1976, pp. 33, 200). A discrepancy between the arithmetical rule and our ‘findings’ is an immediate reason to think that there is something wrong with our ‘findings’, rather than with the rule itself (cf., ibid., pp. 44, 257). That is, if Thom counts 4 apples in Box A, Jónsi counts 3 apples in Box B, and PJ counts 8 apples in Boxes A & B, we will not thereby conclude, ‘So, I guess that 4 apples + 3 apples = 8 apples after all!’. We would instead conclude either that one of Thom, Jónsi, or PJ has miscounted, or that an apple was added to one of the boxes before PJ performed their count, or cite some other reason that preserves the arithmetical rule that 4 apples + 3 apples = 7 apples. (Although none of us would need an independent arithmetical justification of this particular obvious rule, we could imagine more complex analogues, say, using larger numbers, where one might desire a proof or calculation for extra assurance. But the justification would be a matter of arithmetical proof or calculation, rather than empirical investigation.) It is in this sense that mathematical propositions regularly function as rules regulating certain areas of our (empirical) discourse, and are thus importantly different from empirical propositions themselves.

Notice that, by drawing out such differences, Wittgenstein is not making a sophisticated philosophical suggestion so much as noting obvious facts about the ordinary uses of our expressions (Wittgenstein, Reference Wittgenstein and Diamond1976, p. 22). The assimilation suggested by Hardy gains its power by overlooking such facts. If there is any sense to be made of ‘a reality corresponding to’ mathematical propositions, it will need to pay heed to these obvious facts. Going back to where we started, this is the ‘false idea of the role which mathematical and logical propositions play’ (ibid., p. 239): namely, that they play the same essential role as do empirical propositions and thus ‘correspond to reality’ in essentially the same manner.

5. Application to Benacerraf's, ‘Mathematical Truth’

Wittgenstein's discussion of mathematical ‘truth’ in his lectures goes a long way towards deflating the pictures of mathematics offered by Hardy and Benacerraf. According to the therapeutic perspective, a primary source of Hardy's picture and others that resemble it is the assimilation of mathematical propositions with empirical propositions like ‘Jones is tall’, ‘There are at least three cities larger than New York’, or ‘There are no apples in the fridge’. Granted: these propositions sound quite similar to ‘3 is prime’, ‘There are at least three perfect numbers greater than 17’, and ‘There are no prime numbers in the set of even numbers (except 2)’, respectively. We can also attach ‘It is true: …’ to the front of each without any confusion in practice. But for all that, it would be a mistake to infer any deeper similarity on the basis of these parallels in sound and syntax.

Further, the fact that Hardy's and Benacerraf's pictures rely on such an argument from these similarities (superficial, by Wittgenstein's lights) to a deeper similarity in nature or function shows a subtle movement in thought that is quite easy to overlook, yet, once it is pointed out, is obviously suspect. One person might observe the similarities between propositions noticed by Hardy and Benacerraf and think, ‘That's impressive! This must reveal a fundamental similarity’, and yet another might (either independently or upon reading Wittgenstein's remarks) respond, ‘So what? We use the word “true” in both contexts – why is this supposed to lead us to an exotic metaphysical picture of mathematics?’ Putting the therapeutic perspective aside for just a moment: an adequate philosophical defence of Hardy's or Benacerraf's pictures would have to tell us why one reaction is somehow privileged over the other. But hopefully, if Wittgenstein's therapeutic strategy has had any effect, by this point one will feel the push towards a quite different attempt at gaining clarity: to describe in some detail how the various things called ‘propositions’ are actually used, without any presumption that they are somehow fundamentally similar in their nature or function.

Although Benacerraf's paper came many years after Wittgenstein's discussion of Hardy in his lectures, it is easy to see that his distinctive contributions to the discussion of mathematical ‘truth’ and ‘reality’ are equally vulnerable to Wittgenstein's therapeutic strategies. Benacerraf argues that a uniform theory of truth, such as that provided by Tarski, shows that mathematical sentences have the very same kinds of truth conditions as empirical sentences. I repeat his examples here for clarity.

1. (1) There are at least three large cities older than New York.

2. (2) There are at least three perfect numbers greater than 17.

Sentences (1) and (2) have the very same (syntactic) form, namely:

1. (3) There are at least three FG's that bear R to a.

We are meant to infer from this similarity in syntactical form that (2), just as much as (1), says something about a collection of objects. However, the objects referred to in (2) – ‘out there’ in some sense – are beyond our causal grasp. But why should we infer that (2) refers to objects in the very same way that (1) does? Or, similarly, why should we think that the ‘objects’ referred to in (2) are somehow similar to the objects of (1) – i.e., as being ‘out there’, yet beyond our causal reach? (As if a number were like an apple or a chair, but somehow ghostly and transparent – passing through all things without touching them.) Benacerraf's argument is that an adequate theory of truth shows them to have the very same kind of truth conditions.

Wittgenstein's response however would be the following: you've pointed out an interesting syntactic and phonetic similarity between (1) and (2), but for all that, you haven't given us any reason to think these propositions are therefore exactly the same, either in ‘saying how things are’, or ‘referring to objects in the very same way’, or ‘implying an independent reality “out there” for us to “discover”’. A similarity in syntax does not all on its own reveal any deeper similarity, that is, not unless there is somehow a fundamental similarity between the roles or uses of these sentences.

Their roles or uses, however, are quite different. We can venture out to study the various cities of the world – whether by foot, car, boat, or plane – study historical records in order to determine their ages by some acceptable standard, collect our data, and make a report about the findings. By contrast, as was mentioned earlier, grappling with (2) will require calculation or proof (or, again, the reliance on someone else's calculations): it certainly won't require ‘venturing out’, studying historical records, or doing anything that can't be performed on a blackboard or with pencil, paper, and a decent calculator (Wittgenstein, Reference Wittgenstein and Diamond1976, p. 249). It might involve programming a computer to go through the series of numbers for us to determine whether a perfect number has been found – and however ‘experimental’ that might be, it is still quite different from determining whether (1) is true. These clear and obvious differences in roles make it difficult to motivate the assumptions that Benacerraf's argument requires, namely, (i) that empirical and mathematical propositions are true in the very same sense of ‘truth’ and (ii) that this sense is captured fully by Tarski's formalism. Again, there is indeed a similarity in syntax, but the differences between the uses of these propositions make it difficult to see why an exotic mathematical reality, somehow resembling empirical reality, should be inferred from such similarities.

It is quite important, however, to recognize that Wittgenstein's aim is not simply to remove from our language the expressions ‘(1) and (2) have similar truth conditions’, or ‘(1) and (2) refer to objects’, or ‘(1) and (2) both (in some sense) correspond to reality’.Footnote ¹⁷ After all, these are just English sentences – ones that might have, or might be given, a perfectly ordinary and acceptable use in practice. The first sentence, ‘(1) and (2) have similar truth conditions’, for instance, might just be a way of saying that (1) and (2) have the syntax represented by (3). Wittgenstein doesn't need to dispute this trivial and obvious fact. Compare Wittgenstein's famous remark, ‘Say what you please, so long as it does not prevent you from seeing how things are’ (Wittgenstein, Reference Wittgenstein, Hacker, Schulte, Anscombe, Hacker and Schulte2009, §79). The threat, then, is in being misled by such expressions in such a way that we overlook clear differences between the uses of mathematical and empirical propositions, thereby being prevented ‘from seeing how things are’ (cf., Wittgenstein, Reference Wittgenstein and Diamond1976, p. 251). Such a threat is explicitly brought up in Benacerraf's paper and thus requires our attention: namely, an inference from the syntactic similarities of empirical and mathematical propositions to a special epistemological problem for mathematics.

Recall that Benacerraf concluded from the similarity in truth-conditions between (1) and (2) (i.e., their syntactical similarities as emphasized in the Tarskian framework) that they both equally refer to objects (and in the same sense of ‘object’), yet the objects referred to in (2) are beyond our causal reach and thus create a special problem about how they can so much as be known. So, the invocation of ‘(1) and (2) have similar truth conditions’ in Benacerraf's paper immediately leads to philosophical questions and problems (e.g., ‘What is a mathematical object really?’Footnote ¹⁸, or ‘How is knowledge of a mathematical theorem possible?’). These questions and problems, in turn, rely on overlooking the crucial differences between (1) and (2) – or, more specifically, overlooking their differences at the wrong time in this movement of thought, as I will explain now.

For consider that one could completely flip Benacerraf's reasoning around. (We discussed a similar strategy earlier in section 4.) (2) is ‘known’ in an entirely different manner than (1) – that is, the circumstances in which we say that we ‘know’ (2) are very different from the circumstances in which we say that we ‘know’ (1). ‘Knowing’ (1) requires literally venturing out, studying documents, and reporting the results found (or otherwise relying on folks who have done this work). ‘Knowing’ (2) requires either proof or calculation; it certainly doesn't require venturing out, pointing to objects in the literal sense of ‘pointing’, making certain observations with our eyes or ears, studying historical documents, and so on. These are obvious differences between the uses of ‘know’ with respect to each of (1) and (2). Given these obvious differences, why should we think that their truth-conditions (in some sense independent of their syntax) are ‘fundamentally the same’? More specifically, given that ‘knowing’ (2) doesn't involve anything like literally venturing out or literally pointing to objects, etc., why should we think that each of these sentences refers to objects in the very same manner? It seems that the sole motivation of Benacerraf's picture is the syntactic similarity between (1) and (2), codified and made explicit by the Tarskian framework. But those are just similarities in sound and syntax – they shouldn't lead us to think that there is some special problem of knowledge for basic arithmetical propositions. Of course, Benacerraf does recognize crucial differences between mathematical and empirical propositions, albeit not early enough in his reasoning to disrupt the picture of reality that is thereby concocted. He first infers a fundamental similarity, i.e., that (1) and (2) are true in the very same sense (since they both have the form of (3)). Only after this does he note crucial differences, e.g., that one does not literally look at or point to, say, the number 2, which then creates a special epistemological problem: ‘since I don't have causal access to the number 2, how can I know anything about it?’ Wittgenstein's strategy is to shift the order of considerations:Footnote ¹⁹ one does not literally look at or point to, say, the number 2 when determining whether ‘2 + 2 = 4’; so it would be highly misleading to think that ‘Jones is tall’ and ‘2 + 2 = 4’ are true in the very same way. They involve distinctive uses of ‘true’ that take part in distinctive language-games. Likewise, they involve distinctive uses of ‘know’. So much is obvious once we examine the differences between their uses or roles in ordinary life.

A defender of Benacerraf might point out that in his paper he is also concerned to undermine attempts to identify ‘truth’ with proof-conditions or justification-conditions more generally.Footnote ²⁰ It might seem thus far that Wittgenstein is doing just this. But the line of thought considered throughout this paper has nothing to do with identifying, say, the ‘truth’ of mathematical claims with their justification-conditions. After all, ‘true’ and ‘proposition’ are considered by Wittgenstein to be conceptually on a par – one does not stand independently and somehow illuminate the other all on its own (Wittgenstein, Reference Wittgenstein, Hacker, Schulte, Anscombe, Hacker and Schulte2009, §§134–37).Footnote ²¹ Instead, we need to examine the language-games to which they both equally belong; what is important above all is how ‘true’ and ‘proposition’ are used in mathematics. It thus would not make much sense for Wittgenstein to seek a ‘theory of truth’ in the first place, such as one according to which truth is identified with proof or justification. Just as ‘true’ and ‘proposition’ belong to the language-games of arithmetic, so do ‘know’, ‘certain’, ‘justified’, and the like. Wittgenstein is merely pointing to obvious differences between these concepts as they play out in arithmetical and non-arithmetical language-games (such as determining how many cities are older than New York). For all that Wittgenstein says, there might very well be conditions for ‘knowing’ in some language-games that do not require any proof or calculation whatsoever. Our ‘knowledge’ that 2 + 2 = 4 would be an obvious example in ordinary life, since it is learned by rote and never requires further justification. (Notwithstanding mathematical logicians who play a distinctive language-game in which this too requires proof, a language-game in which distinctive rules for ‘knowing’ and ‘justification’ are deployed.) Attention to the obvious differences between mathematical and empirical propositions disrupts the analogy that Hardy and Benacerraf rely on in their invocation of a special mathematical reality.

In short, then, Wittgenstein's approach is entirely different from the proof-theoretic strategy Benacerraf considers and rejects in his paper and does not fall prey to his arguments against it. His approach is also not disrupted by the introduction of Tarski's formal work on ‘truth’ (the novel contribution of Benacerraf) into this dialectic. Tarski's formal work systematizes and makes explicit syntactic similarities across various different kinds of propositions; it does not thereby (without confusion) imply a distinctive and mysterious reality, somehow akin to empirical reality, to which mathematical claims refer. To be clear, this does not require a rejection of Tarski's mathematical work, it merely challenges Benacerraf's application of Tarski's formal framework and his attempt to show that it leads to special epistemological and metaphysical problems for mathematics.Footnote ^22, Footnote ²³