2.1. BF proofs don't exist

One might suspect that the above argument rests on a conceptual mistake: the notion that brokenness and fixability are compatible, and the dependent claim that some BF proofs exist.

The basic issue is this. A broken proof, by definition, takes substantial work to repair. But if a proof is too flawed, then repairing it will exceed experts' capabilities, and hence the proof will no longer count as fixable. It's perhaps unclear that one can have it both ways at once. A skeptic might make an argument like the following: “Fixing a broken proof requires creativity and original thinking. But creatively generating a novel piece of a proof is tantamount to devising significant new mathematics, and a proof whose errors require new mathematics is unfixable by definition. So fixability and brokenness aren't compatible.”

But this argument doesn't work, and the conclusion is mistaken. The argument fails because it wrongly equates one kind of inventiveness – namely, the insight needed to see how to fix a problem using existing techniques – with a distinct kind – namely, the creation of novel mathematics. A broken proof can easily require the former without requiring the latter.

The original proof of Jordan's curve theorem is a plausible historical example of a BF proof. (The curve theorem is the fact that every non-self-intersecting closed curve in ℝ² divides the plane into exactly two connected components.) It's generally agreed that Jordan's own attempted proof, given in his Cours d'Analyse, wasn't completely correct. For some time Jordan's proof was thought to be hopeless, and the first widely accepted proof due to Veblen used entirely different methods. But subsequent reevaluation of Jordan's proof has yielded a more positive assessment. Many mathematicians now consider its flaws modest and repairable. According to Michael Reeken, for instance, “Jordan's proof does not present the details in a satisfactory way. But the idea is right and with some polishing the proof would be impeccable” (quoted in Hales [Reference Hales2007]: 46). Hales himself presents a modernized version of Jordan's proof, with the aim of “preserv[ing] all of Jordan's major ideas, while avoiding [the original proof's] minor shortcomings” (46). The current consensus seems to be, then, that Jordan's proof was flawed but basically sound, and that fixing its errors requires no substantial innovations.

A second historical case is Perelman's proof of the Poincaré conjecture. It's well known that Perelman was awarded (and refused) both a Fields Medal and a Clay Institute Millennium Prize for proving Poincaré's 1904 statement about 3-manifolds homeomorphic to the 3-sphere. What's less widely known is that Perelman's papers presented a proof sketch rather than a complete argument. In the years since the appearance of the papers in 2003–4, several groups of mathematicians have scrutinized and retooled parts of Perelman's work in order to turn his ideas into a fully articulated proof. In addition to the gaps in need of filling, this process has uncovered a number of mistakes in Perelman's arguments. But it's generally agreed that these errors are all fixable. As the authors of one set of notes write: “Regarding the proofs, [Perelman's 2003 and 2004 papers] contain some incorrect statements and incomplete arguments, which we have attempted to point out to the reader…We did not find any serious problems, meaning problems that cannot be corrected using the methods introduced by Perelman” (Kleiner and Lott Reference Kleiner and Lott2008: 2588). Similarly, the authors of a detailed 2006 presentation of Perelman's proof conclude that, in spite of the need for repairs, “full credit [for] proving Poincaré's conjecture goes to Hamilton and Perelman” (Cao and Zhu Reference Cao and Zhu2006: 4).Footnote ⁶

These cases show that BF proofs exist in practice and not just in theory. They also suggest that Habgood-Coote and Tanswell's notion of fixability tracks mathematicians' judgments about acceptability: what determines whether a proof contains “serious problems,” and whether its author deserves credit for the result, is in part whether the errors in the proof can be repaired using existing techniques. This gives some reassurance that the fixability standard captures a genuine element of mathematical practice.

2.2. BF proofs aren't acceptable

The second option, and perhaps the most immediately appealing, is to deny that any BF proofs are ever (knowingly) accepted by the mathematical community.

Before discussing this option, let me clarify the notion of acceptance at issue here. To say that ${\cal P}$ is accepted as a proof of T is to say that the relevant experts consider ${\cal P}$ adequate to establish T. As the Jordan and Poincaré cases suggest, some telling symptoms of ${\cal P}$'s acceptance are as follows:

• • ${\cal P}$ is published (or deemed publishable) in a mainstream mathematics journal.

• • The discoverer of ${\cal P}$ is credited with having proved T.

• • ${\cal P}$ is cited or used by other mathematicians as a proof of T.

If T is regarded by the community as a proven theorem, it follows that at least one proof of T has been accepted.Footnote ⁷

It's easy to see why BF proofs might seem unacceptable. After all, BF proofs fail to give complete and correct arguments for their conclusions. And surely an acceptable proof has to do that, whatever else it does.

This line of thought may be intuitively plausible, but in fact it doesn't accurately reflect mathematical practice. Mathematicians are often happy enough to accept incomplete or flawed proofs, provided that the problems aren't too serious and that someone knows (or could figure out) how to fix them. The operative standard for proof acceptance is often closer to “believed to be correct in outline” than to “confirmed accurate in every detail.”

One way to see this is by considering the refereeing process for mathematics journals. Reviewers aren't generally expected to check every line of a submitted proof, and most don't do so. As the number theorist Melvyn Nathanson writes: “Many (I think most) papers in most refereed journals are not refereed. There is a presumptive referee who looks at the paper, reads the introduction and the statements of the results, glances at the proofs, and, if everything seems okay, recommends publication. Some referees do check proofs line-by-line, but many do not” (Nathanson Reference Nathanson2008: 773).

Data obtained from mathematics journal editors and referees largely corroborate this picture. In a survey of editors, “estimating the novelty of results” was rated a more important task for referees than “checking the correctness of results,” and about half the editors surveyed said that referees should check some but not necessarily all of a paper's arguments in detail (Geist et al. Reference Geist, Löwe, Van Kerkhove, Löwe and Müller2010). Similarly, in her interviews with seven mathematicians about their refereeing practices, Line Andersen found them to be focused on overall believability rather than local accuracy. Andersen summarizes her findings as follows:

Unsurprisingly given these methods, Andersen concludes that “[p]ublished proofs often contain minor errors, but it appears that they rarely contain critical or unrepairable errors” (185).

If BF proofs were deemed generally unacceptable, this is surely not the attitude toward mistakes one would expect from mathematicians and their acceptance-signaling institutions. The fact that the discipline shows a great deal of tolerance for fixable errors in published proofs is strong evidence that such mistakes are no bar to acceptability.

For a concrete example of a broadly accepted proof containing many mistakes (some subsequently fixed, others as yet unfixed, still others presumably unknown), I refer readers to Habgood-Coote and Tanswell's (Reference Habgood-Coote and Tanswell2023) discussion of the classification of finite simple groups. As Habgood-Coote and Tanswell show, mathematicians' positive appraisal of the proof of the classification theorem is based largely on optimism about its repairability – an optimism seemingly untroubled by the complex, decades-long process of identifying problems and making the necessary repairs, which is still far from complete. If broken proofs were always unacceptable, no mathematician could reasonably call the classification theorem a proven result. And yet group theorists do so. I conclude that BF Thesis is true.

2.3. BF proofs are transferable

According to the third strategy I want to consider, BF proofs are transferable after all, and hence premise 3 of the above argument is false.

Perhaps the most promising way to make this case is by comparing mistakes to gaps. Everyone agrees that acceptable informal proofs are often gappy, in the sense that they omit premises or pieces of reasoning that are necessary for their arguments to work. But the presence of gaps (of the right kind) need not conflict with transferability. As Easwaran says, “a proof sketch can in many cases be sufficient for the reader to convince herself of the result” (355), and so a gappy proof will be transferable as long as the gaps are “ones that relevant experts can see and still be convinced” (355, fn. 14). In practice, these are precisely the kinds of omissions typically found in published proofs: mathematicians leave out details which are tedious to state and which would be easily reconstructable by fellow experts (Andersen Reference Andersen2020; Fallis Reference Fallis2003). Say that a proof has benign gaps if it omits details of this kind.

Is a proof containing fixable mistakes really so different from one containing benign gaps? It might seem not. Both mistakes and gaps represent respects in which a proof is incomplete as stated. Both may require the reader to exert some effort in order to arrive at full conviction and understanding. And a sufficiently well-informed reader should be able to succeed at this if the mistakes are truly fixable or the gaps are truly benign. It's tempting to conclude from these similarities that BF proofs must be transferable if gappy proofs are.

There's something to this argument, but I don't think it refutes premise 3 in anything like full generality. To see why the comparison fails, recall that a proof is transferable only if the information contained in the proof is sufficient to convince a well-informed reader of its conclusion. Benignly gappy proofs satisfy this condition because their omissions are chosen to complement experts' background knowledge. A typical reader can therefore follow the proof without having to do any significant extracurricular work.

This isn't to say that every benign gap can be easily and thoughtlessly filled by any expert. Some amount of cognitive effort, or even a considerable amount, may be required. But this is also true of proofs whose steps are fully specified. It isn't always trivial to see that T follows from P, Q, R, and S, even if all the relevant propositions and inferential relations are spelled out: reasoning is hard, after all, and human capabilities are limited. So the distinguishing feature of benign gaps isn't ease, but rather straightforwardness. In a benignly gappy proof, it's clear which pieces are missing, and a knowledgeable reader will need minimal creativity to fill them in.

The same isn't true for BF proofs, at least not in general. Perhaps some BF proofs will count as transferable, if their mistakes are minor and the fixes simple. But not all BF proofs are like this. In typical cases, identifying and fixing the errors in a BF proof will require resources beyond the information contained in the proof and the background knowledge it presupposes.

To start with, the reader will have to notice the fatal errors and appreciate their significance. This might itself be a highly non-trivial task – if the proof's author could overlook the problems after thinking through the argument many times, it will be easy for the average reader to do the same. And assuming the mistakes are recognized, the reader will have to perform a substantial, open-ended search for a suitable problem-solving strategy, often with no guarantee of success. (Even if the theorem is known to be true on the basis of some alternative proof, this attempt might turn out to be hopeless.)

In general, none of this will be straightforward in the sense required for transferability: while a fixable proof requires no new mathematics to repair, it may well require creative and non-obvious uses of existing mathematics. And when a proof makes such demands, a typical expert will need more than the proof and their prior knowledge to become convinced of the result.

One might wonder whether a proposal of Habgood-Coote and Tanswell's can vindicate the claim that BF proofs are transferable. On the proposal in question, we have reason to prefer a collectivized or social notion of transferability over Easwaran's individualist notion. A proof counts as transferable in the social sense if “a relevant expert community would become convinced of the truth of the theorem just by consideration of each of the steps in the proof” (23).

The motivation for this proposal derives from cases like that of the classification theorem. As Habgood-Coote and Tanswell point out, the current proof of the theorem is too long and complex for any single human mathematician to review, and the proof is therefore not transferable in a practical sense: no actual person can become convinced by a proof which no actual person can competently read through. Even if a single mathematician has never studied each part of the proof and deemed them all acceptable, though, it's plausible that the group theory community as a whole has done so. Each step has been reviewed and approved by some group theorist at some point, and these verdicts are common knowledge. By pooling its members' attitudes toward the parts of the proof, it seems, the community has become convinced of the truth of the theorem.

This case seems to show that unsurveyability Footnote ⁸ is compatible with transferability in the social sense. Is the same true of brokenness? That is, will a BF proof typically be transferable with respect to a relevant expert community, even if it fails to be transferable with respect to individual community members? If so, this would provide a way to reject premise 3. We'd only have to follow Habgood-Coote and Tanswell in adopting the social notion of transferability.

I don't believe this strategy can be used to show that BF proofs are transferable.Footnote ⁹ Brokenness differs from unsurveyability in a crucial respect. The latter is primarily a problem of individual cognitive limitations: what's too complex for a single person may be tractable for many mathematicians working together. But brokenness is primarily an intrinsic property of a proof: the existence and severity of a set of mistakes doesn't depend on the number of mathematicians reviewing the argument. So a broken proof that's untransferable for one will be untransferable for many.

Of course it's true that, by putting its members' heads together, a community may be able to fix a broken proof more efficiently than a single expert could. But we can't infer much from this. As argued above, the barrier to transferability posed by broken proofs has to do with straightforwardness rather than ease and effort. The issue is whether the information contained in the proof (together with standard background knowledge) suffices for conviction, or whether significant and open-ended additional work is required. If this sort of work is required – as it often is with BF proofs – it's required of a community no less than of a single mathematician.

Perhaps there are rare cases in which it makes a difference to adopt the social viewpoint. For instance, some proofs may contain errors that are barely complex enough to count as substantive for any individual mathematician, but which, by combining its members' knowledge, the community as a whole could repair immediately with minimal creativity. This would be a case of a proof that's broken and hence untransferable in the individual sense, but non-broken and transferable in the social sense. Even if this sort of case is possible in principle, though, it requires special conditions that are surely uncommon in practice. There's no reason to expect most errors to pose precisely the sort of difficulty that's trivial for the expert community but non-trivial for any single expert.

I conclude that premise 3 is true, at least for typical choices of ${\cal P}$. BF proofs are often not transferable.

2.4. Some acceptable proofs are non-transferable

The fourth possibility is that some acceptable proofs are non-transferable, and hence that Transferability Thesis is false. Having ruled out the other options, this last one had better be correct – and I think it is.

In view of the above discussion, the problem with Transferability Thesis is evidently as follows. An acceptable proof is not necessarily one that a typical expert would find convincing as is, but rather one that an expert would judge to be correct in outline and fixable where broken (by the relevant mathematical community using the methods at their disposal, not necessarily by the reader herself). So acceptable proofs need not be transferable, but merely corrigible.

I take corrigibility to be closely related but not identical to Habgood-Coote and Tanswell's notion of fixability. The requirement that corrigible proofs be basically correct, or correct in outline, is one difference.

Some motivation for this requirement: consider Alice, a poorly prepared calculus student who's asked to prove the intermediate value theorem on an exam. Having reviewed her notes for a few minutes before class, she vaguely remembers some important steps of the proof – let c be the supremum of something, show that c can't be either smaller or bigger than something. She manages to produce a few patchy and confused lines with a passing resemblance to the textbook proof.

Is Alice's proof fixable, in Habgood-Coote and Tanswell's sense? Apparently it is, since any calculus teacher could fix its mistakes without having to invent new mathematics. But the proof surely isn't acceptable. (It couldn't be published in a decent journal, for instance, even if no other proof existed yet.) The reason, I take it, is that an acceptable proof has to be correct in spirit – it has to know what it's trying to do, and it has to have a clear and workable plan for getting there, even if it fails to finesse certain details. This strikes me as an importantly stronger constraint than what's required by fixability, and one that better captures the precise type of error-tolerance displayed by mathematicians.Footnote ¹⁰

The claim that acceptable proofs need only be corrigible points to a complex and underappreciated social dimension of acceptability. A lone mathematician can determine that a mistake-free proof is acceptable – all analyses agree about this. Similarly, there's no problem if a reader notices mistakes which she knows how to fix herself. The most interesting case is when a proof is known or suspected to contain errors which the reader doesn't trust herself to catch, or isn't sure how to fix, but which she reasonably believes to be detectable and repairable by the community if necessary.

I've tried to show that this last case is common on the frontiers of research, where mathematicians are often expected to make determinations of acceptability without being able to personally verify every step of a purported proof. So it's important for a theory of acceptability to get this case right. If the arguments I've given are correct, then most standard accounts (including Easwaran's) have failed here. Contrary to received wisdom, a proof that's known or suspected to be broken can nevertheless be acceptable – and in fact many such proofs are accepted all the time.Footnote ¹¹

This conclusion also seems to conflict with De Toffoli's suggestion that a proof is acceptable only if it's transferable, and transferable just in case it's a priori verifiable (De Toffoli Reference De Toffoli2021). Assuming that “verifiable” entails “correct as stated,” BF proofs seem not to be verifiable at all.

These problems notwithstanding, though, it's hard to believe that Transferability Thesis is entirely misguided. There's surely something to Easwaran's observation that mathematicians reject probabilistic proofs because some of their steps are uncheckable black boxes. And nothing in the above dialectic challenges this insight. Probabilistic proofs fail to be transferable in a completely different way than BF proofs, so the acceptability of the latter implies nothing about the former.

So it may be fruitful to think of Easwaran's notion of transferability as comprising two distinct properties, only one of which is truly required for acceptability. The first such property is that of all the steps in a proof being independently checkable in principle by any competent reader. Call this feature evaluability.Footnote ¹² The second such property is that of a proof containing all the information necessary to be recognized as correct by a typical expert with appropriate background knowledge. Call this feature impeccability. Easwaran makes a convincing case that acceptable proofs must be evaluable. But I've argued that acceptable proofs need not be impeccable – corrigibility will do instead.