2. The undecided nature of Weyl’s thought

3. Towards a philosophical approach to normative transitions

The question of how someone can rationally deem his own standards of propriety to be normatively improper in a rational manner has puzzled Menachem Fisch for decades. In his recent works (Fisch Reference Fisch2017; Fisch and Benbaji Reference Fisch and Benbaji2011), Fisch has proposed a theory about the possibility of rationally changing our normative commitments, in which he claims that by intrasubjective deliberations alone we are unable to reach the self-critical lines and cannot rationally change our standards. However, and here lies the novelty of his argument, exposure to the echo chambers of normative criticism coming from outside, from people who are committed to different frameworks, can have a destabilizing impact. Or, to use Fisch’s expression, it can “ambivalate” (Fisch Reference Fisch2010, 530, 533).

Fisch has observed that practitioners of standing are liable, when normatively ambivalated, to produce curiously split and hybrid accounts of the foundations of their field in an attempt to breed a newly found undecidedness. Examples for Fisch’s theory are the stories of Tycho Brahe’s grafting of a heliocentric planetary system on a basically geocentric cosmology, Galileo’s theory of free fall and projectile motion, as well as George Peacock’s two-fold account on algebra. Even though the mature works of Brahe, Galileo, and Peacock are confident presentations of the positions to which they were fully committed, it is their halfway positions and intermediary frameworks (often unpublished and thus concealed from the public eye) that paved their paths. The fact that Tycho, Galileo, and Peacock were able to form and maintain such halfway positions, negotiating between the prevailing theory on the one hand and their new ideas on the other, shows that they had become sufficiently ambivalent towards their own normative frameworks (Fisch and Benbaji Reference Fisch and Benbaji2011, 295–96).

Fisch’s concept of ambivalence refers to a delicate moment in the history of scientific transformations, a moment that can be easily overlooked or dismissed as mere confusion or indecision when analyzed without proper attention. He writes:

Notably important is the difference between ambivalence and persuasion. To render someone ambivalent towards one or more of his or her normative standards does not necessarily mean to convince that person of their unseemliness. Practitioners can become ambivalent towards a theory without being convinced that the prevailing theory is improper. Once exposed to the normative criticism of others, the stage of ambivalence can last months, years, or even a lifetime, during which practitioners are on the lookout for new alternatives without dismissing the old ones. Moreover, ambivalated practitioners often feel torn between the two stances, since “normative ambivalence amounts to being of two minds with respect to certain elements of one’s normative framework; a form of indecisive dithering with respect to those elements,” while “to the remainder of their framework … such ‘ambivalated’ individuals remain wholeheartedly committed” (Fisch Reference Fisch2010, 537).

Fisch’s model of normative transformations introduces two insights about the concept of “becoming ambivalent” that are of significance to Weyl’s story:

1. (1) Ambivalence can sometimes be misinterpreted as indecision or confusion.

2. (2) Ambivalence does not necessarily imply abandonment of old commitments, nor a complete acceptance of new ones.

The story so far gives rise to the question of how practitioners might deal with their own ambivalence. Do they attempt to settle their indecision by turning their back on one of the theories they are torn between? Must the ambivalence be eventually resolved, or can one self-deliberate with one’s own indecision throughout one’s life? The following section will examine how Weyl addressed his own ambivalence, as well as how mathematicians, philosophers, and historians of mathematics viewed it.

4. Ambivalated from within: How did Weyl deal with his own ambivalence?

Weyl’s changing views about the foundations of mathematics were shaped, to a large extent, by his exposure to the echo chambers of several practitioners and groups of mathematicians. The French semi-intuitionists’ criticism of Cantor’s set theory and Zermelo’s axiom of choice (Hesseling Reference Hesseling2003; Moore Reference Moore1982) influenced Weyl’s foundational viewpoint, as can be seen both in Weyl’s Reference Weyl1910 paper on the definition of fundamental mathematical concepts (namely, definable relations) and in Das Kontinuum (Feferman Reference Feferman1998). In the 1918 preface to Das Kontinuum, Weyl describes his then-promising halfway solution: a constructive approach to the foundations of mathematics that will avoid the “vicious circle” of Russell’s paradoxes and Cantor’s set theory and its dangerous implications. He wrote:

Even though Weyl was not a professional philosopher, he was attracted to idealist philosophy, and the latter played a significant role in his foundational thought. When Weyl was a student of mathematics in Gottingen, he attended lectures by Husserl, and during his Zurich years, he was introduced to Fichte’s philosophical views, largely due to the encouragement of his friend and colleague, Fritz Medicus, who was also a professor of idealist philosophy at ETH (Scholz Reference Scholz2004; Sieroka Reference Sieroka2007, Reference Sieroka2009). The influence of both Husserl and Fichte on Weyl is felt in Das Kontinuum, as Weyl specifically addresses Husserl’s philosophical stance in the book’s preface:

At the outset of the discussion on judgement and property in the first chapter of Das Kontinuum, Weyl acknowledged the expertise of metaphysical philosophers, such as Fichte, noting it as essential to achieving a clear definition of what judgement is. He wrote: “We cannot set out here in search of a definitive elucidation of what it is to be a state of affairs, a judgment, an object, or a property. This task leads into metaphysical depths. And concerning it one must consult men, such as Fichte, whose names may not be mentioned among mathematicians without eliciting an indulgent smile”Footnote ⁴ (Weyl Reference Weyl, Pollard and Bole1918, 7).

Much like his foundational stances, Weyl’s philosophical views were also subject to changes. In a lecture delivered in 1954 titled “Insight and Reflection,” Weyl portrayed his long philosophical voyage that had begun with Kant, moved on to idealist phenomenology, and ended with Weyl’s recognition that the latter entails several problematic aspects (Weyl Reference Weyl, Saaty and Weyl1955). Considering these issues, Weyl modified his philosophical approach, which became closer to Cassirer in some aspects, and in other aspects to theologists such as Meister Eckhart (Bell Reference Bell and Richard2004).Footnote ⁵ According to Erhard Scholz, even the deep influence of Fichte’s ideas on Weyl’s thoughts faded over the years, and Weyl’s late reflections indicate that he became closer to Heidegger’s existentialist or Gonseth’s dialectical philosophies in the late 1940s (Scholz Reference Scholz2004).

Henri Poincare also played a significant role in forming Weyl’s foundational as well as philosophical viewpoint. The impact of Poincare’s philosophy of mathematics, specifically his position regarding impredicative definitions and the concept of existence and potential infinity (Poincare Reference Poincare1963), is present in Weyl’s Reference Weyl, Pollard and Bole1918 works. Solomon Feferman argues that in Das Kontinuum, Weyl accepted a significant part of Poincare’s definitionist philosophy, including Poincare’s conception of the natural number and the idea that there are no completed infinite totalities (Feferman Reference Feferman1998, Reference Feferman and Hendricks2000). According to Richard Feist’s reading of Weyl’s Das Kontinuum and Space-Time-Matter, Poincare’s predicativist philosophy led Weyl to modify Husserl’s semantics and ontology; concerning the concept of the natural number, Feist describes Weyl’s definition of it as an amalgam between Poincare’s view and Husserl’s approach (Feist Reference Feist2002).

Two years after the appearance of Das Kontinuum and Space-Time-Matter, the publication of “On the new foundational crisis in mathematics” (1921) suggested that yet another mathematician had shaped Weyl’s thought. Weyl was familiar with Brouwer’s topological work, at least from the early 1910s, as he referred to Brouwer’s “fundamental papers on topology” from 1909 in his paper on Riemann surfaces from 1913 (van Dalen Reference van Dalen2013). There is historical evidence that the two met in 1912, during Brouwer’s visit in Gottingen, but it remains unclear whether they discussed foundational issues at that time.Footnote ⁶

Weyl’s exposure to the echo chambers of Brouwer’s normative criticism of the foundations of mathematics dates back to 1919, when the two met for the second time during a summer vacation in Engadin, and Weyl heard the story of Brouwer’s intuitionism firsthand (van Dalen Reference van Dalen1995, Reference van Dalen2013; Hesseling Reference Hesseling2003). Deeply influenced by Brouwer’s ideas, Weyl wrote the most advocative paper of Brouwer’s intuitionistic program, “On the New Foundational Crisis in Mathematics” (Weyl Reference Weyl and Mancosu1921), which displayed a considerable deviation from the formalist framework to which Weyl had been firmly committed, as well as from the constructive approach Weyl embraced in Das Kontinuum, as an attempt to solve the difficulties Brouwer had raised.

In the 1932 preface to Das Kontinuum, Weyl’s difficulty in properly addressing the foundational problem prevails, but he is less optimistic about the ability of constructive or intuitionistic methods to solve the conundrum. As he puts it:

The indecisive nature of Weyl’s foundational perspective remains omnipresent in his later writings, as observed in his 1946 review paper, where he maintains his skepticism about our ability to confidently build up mathematics from solid foundations. Thus:

Moreover, Weyl’s inclination towards constructive methods for rebuilding the foundations of mathematics did not disappear entirely over the years, as can be observed in one of his last papers “Axiomatic and Constructive Procedures in Mathematics,” written in 1954. In it, he writes that “the constructive transition to the continuum of real numbers is a serious affair… and I am bold enough to say that not even to this day are the logical issues involved in that constructive concept completely clarified and settled” (Weyl Reference Weyl1954, 17).

These citations from Weyl’s scattered works share a commonality: each embodies some aspect of self-reflection about his own shifting stances up to that point. In his 1932 note, he acknowledged that a comprehensive endeavor is required in order to build a bridge between his old beliefs (presented in 1918) and his new ones. In 1946, he confessed that his uncertainty had influenced his own scientific interests; and in 1954, he referred to himself as “bold enough,” since it requires fortitude to maintain an undecided position after so many years, and to still remain unsure. These are the words of a self-conscious man who, as a practitioner in a scientific community, is fully aware of his undecidedness and its problematic aspects. The frequent changes in Weyl’s mathematical views mark the trail he blazed in his fifty-year-long process of becoming ambivalent, living with his indecision, and attempting to resolve it.

5. Confused from without: How do practitioners in the scientific community deal with Weyl’s ambivalence?

Mathematicians, philosophers, and historians of mathematics have tried to account for Weyl’s wavering foundational stances over the years. Solomon Feferman saw in Weyl’s Das Kontinuum a “substantial advance in the predicativist program” (Feferman Reference Feferman1988, 16). He ascribed to Weyl a predicativist position, which was largely derived from Weyl’s criticism against the set-theoretical approach (that involved vicious circles), as well as his views about the irreducibility of the concept of the natural number and the necessity of explicit definitions for mathematical concepts such as sets and functions (Feferman Reference Feferman1998). Even though Weyl repudiated his ideas from Das Kontinuum in favor of Brouwer’s intuitionistic ideas only two years later, Feferman maintained that Weyl continued to regard the predicative approach as being of genuine value and that he “never really gave up the achievements of his 1918 monograph” (Feferman Reference Feferman and Hendricks2000, 181).

Norman Sieroka connects the shifts in Weyl’s foundational stances with the developments in his philosophical thought: Weyl’s objection to reducing mathematics to logic and set theory in Das Kontinuum was based in his reliance on both Fichte and Husserl, but during the 1920s he distinguished between the two, connecting Husserl’s phenomenology to Brouwer’s intuitionism and Fichte’s constructivism to formalism. After a brief affiliation with the “intuitionistic-phenomenological” approach, from 1925, Weyl came to believe that Fichte’s “formalistic-constructivist” approach “was on the right track” (Sieroka Reference Sieroka2009, 90). Sieroka finds analogues between Weyl’s interdisciplinary lines of thought (mathematics, physics, and theory of subjectivity) and suggests that his analysis of Weyl’s “interdisciplinary intellectual neighborhoods” set the ground for “a more systematic elaboration of the role of transformations and invariances in the context of historiographical issues” (Sieroka Reference Sieroka, Bernard and Lobo2019, 120).

Biographical notes about Weyl written by mathematicians often dismiss his intuitionistic deliberations or ascribe them to his philosophical interests, which they consider to be entirely separate from his mathematical work. Michael Atiyah’s short essay, for instance, analyzes Weyl’s contributions to group theory and quantum mechanics while overtly ignoring his engagement with intuitionism and constructivism, and his ongoing ambivalence towards the foundational crisis (Atiyah Reference Atiyah2003). Max Newman dedicated a section he called “mathematical logic” to Weyl’s intuitionistic contemplations, but his piece ends with a functional tone regarding Weyl’s turn to intuitionism, as if Weyl’s only motivation was to make Brouwer’s mathematics accessible to other practitioners (Newman Reference Newman1957, 323).

On the other hand, Dirk van Dalen claims that Weyl’s commitment to intuitionism was not a mere infatuation or transitional stage. Throughout his paper on Weyl’s intuitionistic mathematics, van Dalen portrays Weyl as a life-long admirer of Brouwer’s foundational approach, who could never quite break with his earlier intuitionistic past (van Dalen Reference van Dalen1995). According to van Dalen, the story of Weyl and Brouwer ends with their Zurich meeting, not long before Weyl died, where Weyl remarked sadly: “Brouwer, everything is unsteady again.”Footnote ⁷ John Bell tells a similar story of Weyl’s lasting fascination with intuitionism, specifically with the notion of the mathematical continuum (Bell Reference Bell2000).

Erhard Scholz ascribes “historical rationality” to the moves of Hermann Weyl by taking a “non-systematic” perspective that attempts to elucidate Weyl’s changes of mind (Scholz Reference Scholz and Hendricks2000). Scholz describes Weyl’s inclination towards intuitionism as rooted in his philosophical considerations, which were deeply influenced by Fichte’s approach to the concept of continuum and space. Even though the connection Weyl saw between intuitionism and the established structures of purely infinitesimal geometry may never exist outside his mind, Scholz maintains that “Illusions have often been historical driving forces, and if such closeness may be considered in retrospect as an illusion, we nevertheless have to take it into account, if we want to understand how Weyl became a protagonist in the spread of intuitionistic analysis” (Scholz Reference Scholz and Hendricks2000, 5). Scholz’s attempt to take into account Weyl’s inner “Besinnung” (translated as “reflection” or “contemplation”, see: Scholz Reference Scholz2004, 14) as part of his motivation to consider different foundational ideas is a perspective that I wish to expand upon using Fisch’s concept of ambivalence.

The retelling of Weyl’s story in light of Fisch’s notion of ambivalence suggests a view that enhances Bell’s, van Dalen’s, and Scholz’s readings; it adds to their interpretations a deeper philosophical aspect that is currently missing from their accounts and should not be overlooked if one wants to gain a better understating of Weyl’s shifting positions. Weyl’s ambivalence regarding the foundations of mathematics is a continuous thread that is woven into his writings throughout his life. Thus, his motivation for changing his mind and the roots of his indecision play a significant role within the contours of the whole story.

When Weyl’s undecidedness is addressed as ambivalence in a Fischian manner, the rationale behind his constant change of mind unravels. As a practitioner who had been exposed to external criticism (not only in the form of Brouwer’s intuitionism, but also through the works of philosophers and mathematicians such as Kant, Fichte, Husserl, Poincare, the French intuitionists, and from 1927 Hilbert again), Weyl found himself engaged in normative self-critical deliberations not only about whether mathematics can be built upon intuitionistic, constructive, or formalistic foundations, but also about what it means to be an intuitionist, a formalist, or a constructivist.

Developments in Brouwer’s intuitionism and Hilbert’s formalism-finitism also contributed to Weyl’s foundational considerations. Neither theory remained stagnant over the years. Brouwer’s intuitionistic views changed as he went from addressing the intuition of the continuum as an unanalyzable entity (Brouwer Reference Brouwer1907) to introducing new concepts such as spreads and choice sequences in order to show how points on the continuum are identified with specific choice sequences (van Atten Reference van Atten2017; Brouwer Reference Brouwer1918). A later development in Brouwer’s intuitionism occurred when his proof of fan theorem appeared in 1924, followed by the introduction of continuity theorem dealing with intuitionistic continuous functions (Brouwer Reference Brouwer and van Heijenoort1924, Reference Brouwer and van Heijenoort1927).

Hilbert’s views on the foundations of analysis also transformed during the first decades of the twentieth century (Corry Reference Corry2004), particularly his perspective regarding the logical basis required for rebuilding the foundations of mathematics. Hilbert’s quest for consistency proof in the early 1900s led him to abandon Dedekind’s logicism (Ferreirós Reference Ferreirós2009) and turn to Schröder’s conception of logic, even though it was not particularly suitable for Hilbert’s formalistic purposes (Zach Reference Zach2019). In 1914, a few years after the publication of Russell and Whitehead’s Principia Mathematica, Hilbert became intensely involved with this work. He believed that the point of view developed there could lead to laying down the necessary logical foundations for his axiomatic treatment of mathematics (Mancosu Reference Mancosu1999). Later on, however, he came to realize that other fundamental problems of axiomatics still remained unsolved. Therefore, he devoted the following years (1917-1921) to developing first-order logic and presented his new foundational approach in 1922 as a response to Brouwer’s intuitionism (Hilbert Reference Hilbert and Mancosu1922; Zach Reference Zach and Jacquette2007). Between 1926 and 1928, Hilbert’s program was further developed, as he introduced a distinction between real and ideal formulas, followed by his notions of ideal propositions (Hilbert Reference Hilbert and van Heijenoort1926) and real propositions (Hilbert Reference Hilbert and van Heijenoort1927).

In 1925, as the debate gained increasing attention from practitioners inside and outside the field (Hesseling Reference Hesseling2003), Weyl published a paper in response to Hilbert’s reaction to Brouwer’s intuitionism. Despite the paper’s conciliatory tone, Weyl criticized Hilbert for his intention to “secure not the truth, but the consistency of the old analysis” (Weyl Reference Weyl and Mancosu1925, 136). Brouwer’s intuitionism offered a very substantial and attractive idea of mathematical truth (Dummett Reference Dummett, Rose and Sheperdson1975, Reference Dummett1977), but when Brouwer’s fan theorem proof was published in 1924, it revealed a problematic aspect in the epistemological standards of Brouwer’s intuitionism, threatening the validity and justifiability of the intuitionistic view of mathematical truth (Epple Reference Epple and Hendricks2000). The realization that Brouwer’s intuitionism may not be able to adequately address the notion of mathematical truth as it had promised, alongside the developments in Hilbert’s program (Hilbert Reference Hilbert and van Heijenoort1926; Sieg Reference Sieg1999), might have weakened Weyl’s confidence in Brouwer’s revisionist program and its core concepts, thereby contributing to his feelings of ambivalence.Footnote ⁸

The feeling of ambivalence in Fisch’s model accounts for more than merely explaining the persistence of practitioners’ hesitant stances or indecisive acts; it primarily motivates for action. Driven by their ambivalence, practitioners are motivated to try and reconcile the stances they are torn between, creating new hybrid solutions. Even though these split accounts often preserve the practitioner’s indecision, they serve to ambivalate leading practitioners within the discipline who attempt, in turn, to formulate less jarring accounts (Fisch Reference Fisch2017).

Within the contours of Weyl’s story, I can point to at least two attempts to formulate similar hybridic solutions: one in Weyl’s Reference Weyl, Pollard and Bole1918 monograph Das Kontinuum and another one three years later in “On the New Foundational Crisis in Mathematics.” In Das Kontinuum Weyl suggested subjecting the epsilon relation to type restriction in order to avoid the paradoxes of set theory, and to restrict the use of quantifiers in the set-theoretic comprehension scheme in order to avoid the vicious circle of impredicative definitions (Weyl Reference Weyl, Pollard and Bole1918). The solution he proposed in “On the New Foundational Crisis in Mathematics” was a more radical one, since here Weyl embraced Brouwer’s choice sequences, completely forfeiting arithmetically definable sequences and the principle of excluded middle. Both attempts were to some extent misread, and even though Das Kontinuum is currently held in high esteem, it took the scientific community almost sixty years to properly read it (van Dalen Reference van Dalen2013).

The question of whether Weyl’s attempts are endowed with the same characteristics of hybridity and potential influence as Peacock’s case of “A Treatise on Algebra” is an intriguing question worth pursuing in a study of its own. Nevertheless, the opportunity to address Weyl’s indecision as ambivalence sheds a different light not only on his hesitant stances, but also on his motivations for developing new solutions to the foundational problem.

Weyl’s frequent changes of heart might also be attributed, at least partially, to a wider historical context of cultural shifts. In his monograph, Plato’s Ghost: The Modernist Transformation of Mathematics, Jeremy Gray portrays a connection between individuals’ works and a broader social perspective on transitions in mathematics. Gray argues that between 1890 and 1930, the whole discipline of mathematics went through a cultural shift that he calls a “modernist transformation,” in which individuals’ works that convey genuine intellectual concerns were promoted by “significant groups of people with the right opportunities” who were able to spread them and thereby contribute to the overall process of cultural change (Gray Reference Gray2008, 5). Cultural and political events such as the First World War also played a substantial role in shaping the mathematical landscape (Gray Reference Gray2008, 406–7).

Even though Gray’s analysis mainly focuses on one direction, namely how individuals’ works affected the process of transition (and not the other way around), it would be shortsighted to dismiss the way cultural and historical changes affected Weyl’s views regarding certain theories, concepts, and ideas. As Dirk van Dalen points out, Weyl himself characterized the tone of his 1921 paper as influenced by “the mood of excited times - the times immediately following the First World War” (van Dalen Reference van Dalen1995, 146). It goes beyond the scope of the current paper to comprehensively characterize the impact of cultural transitions on Weyl’s changes of mind and vice versa, but hopefully the perspective presented here on Weyl’s ambivalence provides fertile ground for further research on this topic.

6. Concluding remarks

Throughout this paper, I have attempted to present an alternative view of Hermann Weyl’s turn to intuitionism. My central argument is that a philosophical perspective of normative framework transitions is fundamentally missing from the current historical accounts of Weyl’s story. Specifically, I claim that the key to understanding Weyl’s undecidedness lies in Menachem Fisch’s notion of ambivalence.

Fisch maintains that we are capable of becoming ambivalent, but not ambivalating ourselves towards our norms. Only a trusted criticism coming from without can change our whole point of view and induce a rational, justified transformation of our normative framework. The process of becoming and being ambivalent has no time restrictions and can last throughout a practitioner’s professional career. Moreover, there is no guarantee that ambivalence must eventually resolve in a clear decisive stance. A practitioner can remain ambivalent during his whole life, and Weyl is a case in point.

Unlike other practitioners, who may have experienced the same difficulties regarding the foundational crisis, Weyl expressed his prolonged search for a solution in his writings, explicitly articulating the problematic aspects of every mathematical theory he had considered. The continued tone of ambivalence present in his papers is not a common phenomenon within the mathematical landscape, and it was often attributed to his philosophical inclinations, which also changed over the years. The philosophical perspective presented in this paper suggests ways of providing a different analysis of Weyl’s continuous undecidedness, taking into consideration the intrasubjective process of changing one’s normative framework. Seen thus, Weyl’s so-called shifting positions should be regarded only as symptoms of a much deeper, convoluted intrapersonal process of self-deliberation, in his attempt to find a solid ground on which mathematics can be built.