Hermann Weyl

"Weyl" redirects here. For other persons, see Weil (surname).

Hermann Weyl

Born	Hermann Klaus Hugo Weyl (1885-11-09)9 November 1885 Elmshorn, German Empire
Died	8 December 1955(1955-12-08) (aged 70) Zurich, Switzerland
Fields	Mathematical physics
Institutions	Institute for Advanced Study University of Göttingen ETH Zurich
Alma mater	University of Göttingen
Doctoral advisor	David Hilbert^[1]
Doctoral students	Alexander Weinstein
Other notable students	Saunders Mac Lane
Known for	See list of topics named after Hermann Weyl
Influences	Edmund Husserl^[2] L. E. J. Brouwer
Notable awards	Fellow of the Royal Society^[3]
Signature

Hermann Klaus Hugo Weyl, ForMemRS^[3] (German: [vaɪl]; 9 November 1885 – 8 December 1955) was a German mathematician, theoretical physicist and philosopher. Although much of his working life was spent in Zürich, Switzerland and then Princeton, he is associated with the University of Göttingen tradition of mathematics, represented by David Hilbert and Hermann Minkowski. His research has had major significance for theoretical physics as well as purely mathematical disciplines including number theory. He was one of the most influential mathematicians of the twentieth century, and an important member of the Institute for Advanced Study during its early years.^[4]^[5]^[6]

Weyl published technical and some general works on space, time, matter, philosophy, logic, symmetry and the history of mathematics. He was one of the first to conceive of combining general relativity with the laws of electromagnetism. While no mathematician of his generation aspired to the 'universalism' of Henri Poincaré or Hilbert, Weyl came as close as anyone. Michael Atiyah, in particular, has commented that whenever he examined a mathematical topic, he found that Weyl had preceded him (The Mathematical Intelligencer (1984), vol.6 no.1).

Biography

Weyl was born in Elmshorn, a small town near Hamburg, in Germany, and attended the gymnasium Christianeum in Altona.^[7]

From 1904 to 1908 he studied mathematics and physics in both Göttingen and Munich. His doctorate was awarded at the University of Göttingen under the supervision of David Hilbert whom he greatly admired. After taking a teaching post for a few years, he left Göttingen for Zürich to take the chair of mathematics at the ETH Zurich, where he was a colleague of Albert Einstein, who was working out the details of the theory of general relativity. Einstein had a lasting influence on Weyl who became fascinated by mathematical physics. Weyl met Erwin Schrödinger in 1921, who was appointed Professor at the University of Zürich. They were to become close friends over time. Weyl had some sort of childless love affair with Annemarie (Anny) Schrödinger, while Anny helped raise a daughter whom Erwin had with another woman.^[8]

Weyl left Zürich in 1930 to become Hilbert's successor at Göttingen, leaving when the Nazis assumed power in 1933, particularly as his wife was Jewish. He had been offered one of the first faculty positions at the new Institute for Advanced Study in Princeton, New Jersey, but had declined because he did not desire to leave his homeland. As the political situation in Germany grew worse, he changed his mind and accepted when offered the position again. He remained there until his retirement in 1951. Together with his wife, he spent his time in Princeton and Zürich, and died in Zürich in 1955.

Contributions

Hermann Weyl (left) and Ernst Peschl (right).

Distribution of eigenvalues

Further information: Weyl law, Weyl conjecture, Asymptotic distribution of eigenvalues

In 1911 Weyl published Über die asymptotische Verteilung der Eigenwerte (On the asymptotic distribution of eigenvalues) in which he proved that the eigenvalues of the Laplacian in the compact domain are distributed according to the so-called Weyl law. In 1912 he suggested a new proof, based on variational principles. Weyl returned to this topic several times, considered elasticity system and formulated the Weyl conjecture. These works started an important domain Asymptotic distribution of eigenvalues of Modern Analysis.

Geometric foundations of manifolds and physics

Further information: Weyl transformation, Weyl tensor

In 1913, Weyl published Die Idee der Riemannschen Fläche (The Concept of a Riemann Surface), which gave a unified treatment of Riemann surfaces. In it Weyl utilized point set topology, in order to make Riemann surface theory more rigorous, a model followed in later work on manifolds. He absorbed L. E. J. Brouwer's early work in topology for this purpose.

Weyl, as a major figure in the Göttingen school, was fully apprised of Einstein's work from its early days. He tracked the development of relativity physics in his Raum, Zeit, Materie (Space, Time, Matter) from 1918, reaching a 4th edition in 1922. In 1918, he introduced the notion of gauge, and gave the first example of what is now known as a gauge theory. Weyl's gauge theory was an unsuccessful attempt to model the electromagnetic field and the gravitational field as geometrical properties of spacetime. The Weyl tensor in Riemannian geometry is of major importance in understanding the nature of conformal geometry. In 1929, Weyl introduced the concept of the vierbein into general relativity.^[9]

His overall approach in physics was based on the phenomenological philosophy of Edmund Husserl, specifically Husserl's 1913 Ideen zu einer reinen Phänomenologie und phänomenologischen Philosophie. Erstes Buch: Allgemeine Einführung in die reine Phänomenologie (Ideas of a Pure Phenomenology and Phenomenological Philosophy. First Book: General Introduction). Apparently this was Weyl's way of dealing with Einstein's controversial dependence on the phenomenological physics of Ernst Mach.

Husserl had reacted strongly to Gottlob Frege's criticism of his first work on the philosophy of arithmetic and was investigating the sense of mathematical and other structures, which Frege had distinguished from empirical reference. Hence there is good reason for viewing gauge theory as it developed from Weyl's ideas as a formalism of physical measurement and not a theory of anything physical, i.e. as scientific formalism.

Topological groups, Lie groups and representation theory

Main articles: Peter–Weyl theorem, Weyl group, Weyl spinor and Weyl algebra

From 1923 to 1938, Weyl developed the theory of compact groups, in terms of matrix representations. In the compact Lie group case he proved a fundamental character formula.

These results are foundational in understanding the symmetry structure of quantum mechanics, which he put on a group-theoretic basis. This included spinors. Together with the mathematical formulation of quantum mechanics, in large measure due to John von Neumann, this gave the treatment familiar since about 1930. Non-compact groups and their representations, particularly the Heisenberg group, were also streamlined in that specific context, in his 1927 Weyl quantization, the best extant bridge between classical and quantum physics to date. From this time, and certainly much helped by Weyl's expositions, Lie groups and Lie algebras became a mainstream part both of pure mathematics and theoretical physics.

His book The Classical Groups, a seminal if difficult text, reconsidered invariant theory. It covered symmetric groups, general linear groups, orthogonal groups, and symplectic groups and results on their invariants and representations.

Harmonic analysis and analytic number theory

Weyl also showed how to use exponential sums in diophantine approximation, with his criterion for uniform distribution mod 1, which was a fundamental step in analytic number theory. This work applied to the Riemann zeta function, as well as additive number theory. It was developed by many others.

Foundations of mathematics

In The Continuum Weyl developed the logic of predicative analysis using the lower levels of Bertrand Russell's ramified theory of types. He was able to develop most of classical calculus, while using neither the axiom of choice nor proof by contradiction, and avoiding Georg Cantor's infinite sets. Weyl appealed in this period to the radical constructivism of the German romantic, subjective idealist Fichte.

Shortly after publishing The Continuum Weyl briefly shifted his position wholly to the intuitionism of Brouwer. In The Continuum, the constructible points exist as discrete entities. Weyl wanted a continuum that was not an aggregate of points. He wrote a controversial article proclaiming that, for himself and L. E. J. Brouwer, "We are the revolution." This article was far more influential in propagating intuitionistic views than the original works of Brouwer himself.

George Pólya and Weyl, during a mathematicians' gathering in Zürich (9 February 1918), made a bet concerning the future direction of mathematics. Weyl predicted that in the subsequent 20 years, mathematicians would come to realize the total vagueness of notions such as real numbers, sets, and countability, and moreover, that asking about the truth or falsity of the least upper bound property of the real numbers was as meaningful as asking about truth of the basic assertions of Hegel on the philosophy of nature.^[10] Any answer to such a question would be unverifiable, unrelated to experience, and therefore senseless.

However, within a few years Weyl decided that Brouwer's intuitionism did put too great restrictions on mathematics, as critics had always said. The "Crisis" article had disturbed Weyl's formalist teacher Hilbert, but later in the 1920s Weyl partially reconciled his position with that of Hilbert.

After about 1928 Weyl had apparently decided that mathematical intuitionism was not compatible with his enthusiasm for the phenomenological philosophy of Husserl, as he had apparently earlier thought. In the last decades of his life Weyl emphasized mathematics as "symbolic construction" and moved to a position closer not only to Hilbert but to that of Ernst Cassirer. Weyl however rarely refers to Cassirer, and wrote only brief articles and passages articulating this position.

By 1949, Weyl was thoroughly disillusioned with the ultimate value of intuitionism, and wrote: "Mathematics with Brouwer gains its highest intuitive clarity. He succeeds in developing the beginnings of analysis in a natural manner, all the time preserving the contact with intuition much more closely than had been done before. It cannot be denied, however, that in advancing to higher and more general theories the inapplicability of the simple laws of classical logic eventually results in an almost unbearable awkwardness. And the mathematician watches with pain the greater part of his towering edifice which he believed to be built of concrete blocks dissolve into mist before his eyes."

Quotes

Weyl's comment, although half a joke, sums up his personality:

My work always tried to unite the truth with the beautiful, but when I had to choose one or the other, I usually chose the beautiful.

The question for the ultimate foundations and the ultimate meaning of mathematics remains open; we do not know in which direction it will find its final solution nor even whether a final objective answer can be expected at all. "Mathematizing" may well be a creative activity of man, like language or music, of primary originality, whose historical decisions defy complete objective rationalization.

—Gesammelte Abhandlungen

The problems of mathematics are not problems in a vacuum....

Impredicative definition's vicious circle, which has crept into analysis through the foggy nature of the usual set and function concepts, is not a minor, easily avoided form of error in analysis.

In these days the angel of topology and the devil of abstract algebra fight for the soul of each individual mathematical domain. Weyl (1939b, p.500)

Topics named after Hermann Weyl

Majorana–Weyl spinor
Schur–Weyl duality
Weyl algebra
Weyl basis of the gamma matrices
Weyl chamber
Weyl character formula
Weyl's criterion
Weyl curvature: see Weyl tensor
Weyl curvature hypothesis
Weyl dimension formula, a specialization of the character formula
Weyl equation, a relativistic wave equation
Weyl gravity
Weyl group
Weyl gauge
Weyl's inequality
Weyl integral
Weyl law
Weyl's lemma on hypoellipticity
Weyl's lemma on the "very weak" form of the Laplace equation
Weyl module
Weyl notation
Weyl ordering (Weyl transform)
Weyl's paradox, properly the Grelling–Nelson paradox
Weyl's postulate
Weyl quantization
Weyl scalar
Weyl spinor
Weyl sum, a type of exponential sum
Weyl symmetry: see Weyl transformation
Weyl tensor
Weyl's theorem
Weyl's theorem on complete reducibility
Weyl transform
Weyl's unitary trick
Weyl vector of a compact Lie group
Peter–Weyl theorem
Weyl–Schouten theorem
Weyl transformation

References

↑ Weyl, H. (1944). "David Hilbert. 1862-1943". Obituary Notices of Fellows of the Royal Society 4 (13): 547–526. doi:10.1098/rsbm.1944.0006.
↑ Notes to Hermann Weyl (Stanford Encyclopedia of Philosophy)
↑ 3.0 3.1 Newman, M. H. A. (1957). "Hermann Weyl. 1885-1955". Biographical Memoirs of Fellows of the Royal Society 3: 305. doi:10.1098/rsbm.1957.0021.
↑ O'Connor, John J.; Robertson, Edmund F., "Hermann Weyl", MacTutor History of Mathematics archive, University of St Andrews .
↑ Hermann Weyl at the Mathematics Genealogy Project
↑ Works by or about Hermann Weyl in libraries (WorldCat catalog)
↑ Elsner, Bernd (2008). "Die Abiturarbeit Hermann Weyls". Christianeum 63 (1): 3–15.
↑ Moore, Walter (1989). Schrödinger: Life and Thought. Cambridge University Press. pp. 175–176. ISBN 0-521-43767-9.
↑ 1929. "Elektron und Gravitation I", Zeitschrift Physik, 56, pp 330–352.
↑ Gurevich, Yuri. "Platonism, Constructivism and Computer Proofs vs Proofs by Hand", Bulletin of the European Association of Theoretical Computer Science, 1995. This paper describes a letter discovered by Gurevich in 1995 that documents the bet. It is said that when the friendly bet ended, the individuals gathered cited Pólya as the victor (with Kurt Gödel not in concurrence).

External links

Wikiquote has quotations related to: Hermann Weyl

National Academy of Sciences biography
Bell, John L. Hermann Weyl on intuition and the continuum
Feferman, Solomon. "Significance of Hermann Weyl's das Kontinuum"
Straub, William O. Hermann Weyl Website
Works by Hermann Weyl at Project Gutenberg
Works by or about Hermann Weyl at Internet Archive

Authority control	WorldCat VIAF: 64072393 LCCN: n50018035 ISNI: 0000 0000 8388 6804 GND: 118816624 SUDOC: 031921434 BNF: cb12305695b (data) MGP: 7373 NDL: 00460689