Kurt Mahler

Kurt Mahler: Kurt Mahler, 1970

Kurt Mahler (26 July 1903, Krefeld, Germany – 25 February 1988, Canberra, Australia) was a mathematician and Fellow of the Royal Society.

He was a student at the universities in Frankfurt and Göttingen, graduating with a Ph.D. from Johann Wolfgang Goethe University of Frankfurt am Main in 1927.^[1] He left Germany with the rise of Hitler and accepted an invitation by Louis Mordell to go to Manchester. He became a British citizen in 1946.

Mahler held the following positions:

University of Manchester

Assistant Lecturer at 1937–39, 1941–44

Lecturer, 1944–47; Senior Lecturer, 1948–49; Reader, 1949–52

Professor of Mathematical Analysis, 1952–63

Professor of Mathematics, Institute of Advanced Studies, Australian National University, 1963–68 and 1972–5

Professor of Mathematics, Ohio State University, USA, 1968–72

Professor Emeritus, Australian National University, from 1975.

He was elected a member of the Royal Society in 1948 and a member of the Australian Academy of Science in 1965. He was awarded the London Mathematical Society's Senior Berwick Prize in 1950, the De Morgan Medal, 1971, and the Thomas Ranken Lyle Medal, 1977.

He spoke fluent Chinese and was an expert photographer.

Mahler proved that the Prouhet–Thue–Morse constant and the Champernowne constant 0.1234567891011121314151617181920... are transcendental numbers.^[2]^[3]

See also

Mahler's inequality

Mahler measure

Mahler polynomial

Mahler volume

Mahler's theorem

Mahler's compactness theorem

Skolem–Mahler–Lech theorem

Notes

^ Kurt Mahler at the Mathematics Genealogy Project.

^ Kurt Mahler, "Arithmetische Eigenschaften der Lösungen einer Klasse von Funktionalgleichungen", Math. Annalen, t. 101 (1929), p. 342–366.

^ Kurt Mahler, "Arithmetische Eigenschaften einer Klasse von Dezimalbrüchen", Proc. Konin. Neder. Akad. Wet. Ser. A. 40 (1937), p. 421–428.

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Name Mahler, Kurt

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Date of birth 26 July 1903

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Date of death 25 February 1988

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Categories:
1903 births
1988 deaths
20th-century mathematicians
Fellows of the Royal Society
Fellows of the Australian Academy of Science
Mathematical analysts
Ohio State University faculty
Jews who emigrated to the United Kingdom to escape Nazism
German Jews
British Jews
Australian Jews
Academics of the Victoria University of Manchester
People from Krefeld
German mathematician stubs

Persondata
Name	Mahler, Kurt
Alternative names
Short description
Date of birth	26 July 1903
Place of birth
Date of death	25 February 1988
Place of death

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Kurt Mahler — (* 26. Juli 1903 in Krefeld; † 25. Februar 1988 in Canberra, Australien) war ein deutschstämmiger britischer Mathematiker, der sich vor allem mit Zahlentheorie beschäftigte (Theorie p adischer Zahlen) … Deutsch Wikipedia
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Mahler volume — In convex geometry, the Mahler volume of a centrally symmetric convex body is a dimensionless quantity that is associated with the body and is invariant under linear transformations. It is named after German English mathematician Kurt Mahler. It… … Wikipedia
Mahler (homonymie) — Pour l’article homophone, voir Maler. Cette page d’homonymie répertorie des personnes (réelles ou fictives) partageant un même patronyme. Mahler (homonymie) est un nom de famille d origine germanique notamment porté par : Alma… … Wikipédia en Français
Mahler measure — In mathematics, the Mahler measure M(p) of a polynomial p is Here p is assumed complex valued and is the Lτ norm of p (although this is not a true norm for values of τ < 1). It can be shown that if … Wikipedia
Mahler's compactness theorem — In mathematics, Mahler s compactness theorem, proved by Kurt Mahler (1946), is a foundational result on lattices in Euclidean space, characterising sets of lattices that are bounded in a certain definite sense. Looked at another way, it… … Wikipedia
Mahler's theorem — Not to be confused with Mahler s compactness theorem. In mathematics, Mahler s theorem, introduced by Kurt Mahler (1958), expresses continuous p adic functions in terms of polynomials. In any field, one has the following result. Let be the… … Wikipedia

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Kurt Mahler

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