G. H. Hardy

G. H. Hardy

Infobox Scientist
name = G.H. Hardy


image width = 230px
caption = G.H. Hardy
birth_date = birth date|1877|02|07
birth_place = Cranleigh, Surrey, England
death_date = death date and age|1947|12|01|1877|02|07
death_place = Cambridge, Cambridgeshire, England
residence =
citizenship = British
nationality = British
ethnicity =
field =
work_institutions = Trinity College, Cambridge
alma_mater =
doctoral_advisor =
doctoral_students =
known_for =
author_abbrev_bot =
author_abbrev_zoo =
influences =
influenced =
prizes =
religion = Atheist
footnotes =

Godfrey Harold Hardy FRS (February 7, 1877 Cranleigh, Surrey, England [GRO Register of Births: MAR 1877 2a 147 HAMBLEDON - Godfrey Harold Hardy] – December 1, 1947 Cambridge, Cambridgeshire, England [GRO Register of Deaths: DEC 1947 4a 204 CAMBRIDGE - Godfrey H. Hardy, aged 70] ) was a prominent English mathematician, known for his achievements in number theory and mathematical analysis.

Non-mathematicians usually know him for "A Mathematician's Apology", his essay from 1940 on the aesthetics of mathematics. The apology is often considered one of the best insights into the mind of a working mathematician written for the layman.

His relationship as mentor, from 1914 onwards, of the Indian mathematician Srinivasa Ramanujan has become celebrated. Hardy almost immediately recognized Ramanujan's extraordinary albeit untutored brilliance, and Hardy and Ramanujan became close collaborators. In an interview by Paul Erdős, when Hardy was asked what his greatest contribution to mathematics was, Hardy unhesitatingly replied that it was the discovery of Ramanujan. He called their collaboration "the one romantic incident in my life."

Life

G.H. Hardy was born 7 February 1877, in Cranleigh, Surrey, England, into a teaching family. His father was Bursar and Art Master at Cranleigh School; his mother had been a senior mistress at Lincoln Training College for teachers. Both parents were mathematically inclined.

Hardy's own natural affinity for mathematics was perceptible at a young age. When just two years old, he wrote numbers up to millions, and when taken to church he amused himself by factorizing the numbers of the hymns. [Robert Kanigel, "The Man Who Knew Infinity", p. 116, Charles Scribner's Sons, New York, 1991. ISBN 0-684-19259-4.]

After schooling at Cranleigh, Hardy was awarded a scholarship to Winchester College for his mathematical work. In 1896 he entered Trinity College, Cambridge. After only two years of preparation he was fourth in the Mathematics Tripos examination. Years later, Hardy sought to abolish the Tripos system, as he felt that it was becoming more an end in itself than a means to an end. While at university, Hardy joined the Cambridge Apostles, an elite, intellectual secret society.

As the most important influence Hardy cites the self-study of "Cours d'analyse de l'Ecole Polytechnique" by the French mathematician Camille Jordan, through which he became acquainted with the more precise mathematics tradition in continental Europe. In 1900 he passed part II of the tripos and was awarded a fellowship. In 1903 he earned his M.A., which was the highest academic degree at English universities at that time. From 1906 onward he held the position of a lecturer, who had to teach six hours per week leaving him plenty of time for research. In 1919 he left Cambridge to take the Savilian Chair of Geometry at Oxford in the aftermath of the Bertrand Russell affair during World War I. He returned to Cambridge in 1931, where he was Sadleirian Professor until 1942.

"The Indian Clerk" (2007) is a novel by David Leavitt based on Hardy's life at Cambridge, including his discovery of and relationship with Srinivasa Ramanujan.

Work

Hardy is credited with reforming British mathematics by bringing rigour into it, which was previously a characteristic of French, Swiss and German mathematics. British mathematicians had remained largely in the tradition of applied mathematics, in thrall to the reputation of Isaac Newton (see Cambridge Mathematical Tripos). Hardy was more in tune with the "cours d'analyse" methods dominant in France, and aggressively promoted his conception of pure mathematics, in particular against the hydrodynamics which was an important part of Cambridge mathematics.

From 1911 he collaborated with J. E. Littlewood, in extensive work in mathematical analysis and analytic number theory. This (along with much else) led to quantitative progress on the Waring problem, as part of the Hardy-Littlewood circle method, as it became known. In prime number theory, they proved results and some notable conditional results. This was a major factor in the development of number theory as a system of conjectures; examples are the first and second Hardy-Littlewood conjectures. Hardy's collaboration with Littlewood is among the most successful and famous collaborations in mathematical history. In a 1947 lecture, the Danish mathematician Harald Bohr said, "To illustrate to what extent Hardy and Littlewood in the course of the years came to be considered as the leaders of recent English mathematical research, I may report what an excellent colleague once jokingly said: 'Nowadays, there are only three really great English mathematicians: Hardy, Littlewood, and Hardy-Littlewood.'" [cite book
last=Bohr
first=Harald
authorlink=Harald Bohr
title=Collected Mathematical Works
volume=1
year=1952
publisher=Dansk Matematisk Forening
location=Copenhagen
oclc=3172542
pages=xiii-xxxiv
chapter=Looking Backward
] Rp|xxvii

Hardy is also known for formulating the Hardy-Weinberg principle, a basic principle of population genetics, independently from Wilhelm Weinberg in 1908. He played cricket with the geneticist Reginald Punnett who introduced the problem to him, and Hardy thus became the somewhat unwitting founder of a branch of applied mathematics.

His collected papers have been published in seven volumes by Oxford University Press.

Pure mathematics

Hardy preferred his work to be considered "pure mathematics", perhaps because of his detestation of war and the military uses to which mathematics had been applied. He made several statements similar to that in his "Apology"::"I have never done anything 'useful'. No discovery of mine has made, or is likely to make, directly or indirectly, for good or ill, the least difference to the amenity of the world." [http://www.numbertheory.org/obituaries/LMS/hardy/page83.html] However, aside from formulating the Hardy-Weinberg principle in population genetics, his famous work on integer partitions with his collaborator Ramanujan, known as the Hardy-Ramanujan asymptotic formula, has been widely applied in physics to find quantum partition functions of atomic nuclei (first used by Niels Bohr) and to derive thermodynamic functions of non-interacting Bose-Einstein systems. Though Hardy wanted his maths to be "pure" and devoid of any application, much of his work has found applications in other branches of science.

Moreover, Hardy deliberately pointed out in his "Apology" that mathematicians generally do not "glory in the uselessness of their work," but rather – because science can be used for evil as well as good ends – "mathematicians may be justified in rejoicing that there is one science at any rate, and that their own, whose very remoteness from ordinary human activities should keep it gentle and clean." Hardy also rejected as a "delusion" the belief that the difference between pure and applied mathematics had anything to do with their utility. Hardy regards as "pure" the kinds of mathematics that are independent of the physical world, but also considers some "applied" mathematicians, such as the physicists Maxwell and Einstein, to be among the "real" mathematicians, whose work "has permanent aesthetic value" and "is eternal because the best of it may, like the best literature, continue to cause intense emotional satisfaction to thousands of people after thousands of years." Although he admitted that what he called "real" mathematics may someday become useful, he asserted that, at the time in which the "Apology" was written, only the "dull and elementary parts" of either pure or applied mathematics could "work for good or ill."

Attitudes and personality

Socially he was associated with the Bloomsbury group and the Cambridge Apostles; G. E. Moore, Bertrand Russell and J. M. Keynes were friends. He was an avid cricket fan and befriended the young C. P. Snow who was one also.

He was at times politically involved, if not an activist. He took part in the Union of Democratic Control during World War I, and For Intellectual Liberty in the late 1930s.

Hardy was an atheist. He never married, and in his final years he was cared for by his sister.

Hardy was extremely shy as a child, and was socially awkward, cold and eccentric throughout his life. During his school years he was top of his class in most subjects, and won many prizes and awards but hated having to receive them in front of the entire school. He was uncomfortable being introduced to new people, and could not bear to look at his own reflection in a mirror. It is said that, when staying in hotels, he would cover all the mirrors with towels.

In his [http://www.numbertheory.org/obituaries/LMS/hardy/page86.html obituary] , a former student reports: "He was an extremely kind-hearted man, who could not bear any of his pupils to fail in their researches." — E. C. Titchmarsh (1950)

Hardy’s aphorisms

* "It is never worth a first class man's time to express a majority opinion. By definition, there are plenty of others to do that."

* "A mathematician, like a painter or a poet, is a maker of patterns. If his patterns are more permanent than theirs, it is because they are made with" ideas.

ee also

* Hardy notation
* Hardy space
* Pisot-Vijayaraghavan number
* Hardy's inequality

Books

* Hardy G. H. (1940) "A Mathematician's Apology", Cambridge University Press; Reprint edition (January 31, 1992). ISBN 0-521-42706-1.
* Hardy G. H. (1940) "Ramanujan", Cambridge University Press: London (1940). Ams Chelsea Pub. (November 25, 1999) ISBN 0-8218-2023-0.
* Hardy G. H. and E. M. Wright (1938) "An Introduction to the Theory of Numbers", Oxford University Press, USA; 5 edition (April 17, 1980). ISBN 0-19-853171-0.
* Hardy G. H. (1908) "A Course of Pure Mathematics", Cambridge University Press; 10th edition (June 25, 1993). ISBN 0-521-09227-2. Available [http://www.archive.org/details/coursepuremath00hardrich online] at archive.org.
*citation|id=MR|0030620|last= Hardy|first= G. H.|title= Divergent Series|publisher= Oxford, at the Clarendon Press|year= 1949|pages=xvi+396|isbn= 978-0821826492
*cite book | last = Hardy | first = G. H. | coauthors = London Mathematical Society | title = Collected papers of G.H. Hardy; including joint papers with J.E. Littlewood and others | publisher = Clarendon Press | date = 1966 | location = Oxford | oclc = 823424
*cite book
last = Hardy
first = G. H.
coauthors = Littlewood, J.E.; Pólya, G.
title = Inequalities, 2nd ed
publisher = Cambridge University Press
date = 1952
pages =
isbn = 0521358809

Bibliography

*Robert Kanigel, "The Man Who Knew Infinity: A Life of the Genius Ramanujan" (Washington Square Press, 1991) ISBN 0-671-75061-5
*C. P. Snow, "Variety of Men" (Macmillan, 1967)

References

External links

*MacTutor Biography|id=Hardy
*MathGenealogy |id=17806
* [http://www-gap.dcs.st-and.ac.uk/~history/Quotations/Hardy.html Quotations of G. H. Hardy]
* [http://www.numbertheory.org/obituaries/LMS/hardy/ Hardy's work on Number Theory]
*ScienceWorldBiography | urlname=Hardy | title=Hardy, Godfrey Harold (1877-1947)
*I. Grattan-Guinness, " [http://mubs.mdx.ac.uk/Research/Discussion_Papers/Mathematics_and_Statistics/maths_dpaper_no_4.pdf The interest of G.H. Hardy, F.R.S. in the philosophy and the history of mathematics] "


Wikimedia Foundation. 2010.

Игры ⚽ Нужно сделать НИР?

Look at other dictionaries:

  • Hardy (surname) — Hardy is a surname, and may refer to:A* Aaron Hardy, English footballer * Alexander M. Hardy, U.S. Representative from Indiana * Alexandre Hardy (c. 1570/1572 ndash;1632), French dramatist * Alfred Hardy, (1900 1965), Belgian architect * Alister… …   Wikipedia

  • Hardy–Weinberg principle — for two alleles: the horizontal axis shows the two allele frequencies p and q and the vertical axis shows the genotype frequencies. Each graph shows one of the three possible genotypes. The Hardy–Weinberg principle (also known by a variety of… …   Wikipedia

  • Hardy — bezeichnet: (2866) Hardy, einen Asteroid, benannt nach Oliver Hardy HMS Hardy (H87), einen britischer Zerstörer Hardtail, ein Fahrrad mit ungefedertem Rahmen Hardy (Cognac), einen Cognac Hardy ist der Familienname folgender Personen: Adam Hardy… …   Deutsch Wikipedia

  • Hardy palms — are any of the species of palm (Arecaceae) that are able to withstand colder temperatures and thrive in places not typically considered in the natural range for palms. Several are native to higher elevations in Asia and can tolerate hard freezes… …   Wikipedia

  • HARDY (T.) — «L’athée du village contemplant avec morosité l’idiot du village»: cette description de Thomas Hardy par Gilbert Keith Chesterton est injuste, mais elle attire l’attention sur trois aspects essentiels de l’œuvre. Hardy nous a en effet donné des… …   Encyclopédie Universelle

  • Hardy Krüger — (2007) Hardy Krüger (* 12. April 1928 in Berlin Wedding; eigentlich Franz Eberhard August Krüger) ist ein deutscher Filmschauspieler und Schriftsteller[1]. Inhaltsverzeichnis …   Deutsch Wikipedia

  • Hardy — may refer to:People: See Hardy (surname) Places* Hardy Peninsula, South American peninsulaUnited States* Hardy, Arkansas * Hardy, Iowa * Hardy, Kentucky * Hardy, Virginia * Hardy, MississippiOther* Hardy (fishing) * Hardy (blacksmithing) *… …   Wikipedia

  • Hardy-Weinberg-Equilibrium — Hardy–Weinberg Gleichgewicht für zwei Allele: die horizontale Achse zeigt die beiden Allelfrequenzen p und q, die vertikale Achse zeigt die Genotypfrequenzen. Die drei möglichen Genotypen sind durch unterschiedliche Zeichen dargestellt. Das Hardy …   Deutsch Wikipedia

  • Hardy-Weinberg-Gesetz — Hardy–Weinberg Gleichgewicht für zwei Allele: die horizontale Achse zeigt die beiden Allelfrequenzen p und q, die vertikale Achse zeigt die Genotypfrequenzen. Die drei möglichen Genotypen sind durch unterschiedliche Zeichen dargestellt. Das Hardy …   Deutsch Wikipedia

  • Hardy-Weinberg-Regel — Hardy–Weinberg Gleichgewicht für zwei Allele: die horizontale Achse zeigt die beiden Allelfrequenzen p und q, die vertikale Achse zeigt die Genotypfrequenzen. Die drei möglichen Genotypen sind durch unterschiedliche Zeichen dargestellt. Das Hardy …   Deutsch Wikipedia

  • Hardy-Weinberg-Gleichgewicht — Hardy–Weinberg Gleichgewicht für zwei Allele: die horizontale Achse zeigt die beiden Allelfrequenzen p und q, die vertikale Achse zeigt die Genotypfrequenzen. Die drei möglichen Genotypen sind durch unterschiedliche Zeichen dargestellt. Das Hardy …   Deutsch Wikipedia

Share the article and excerpts

Direct link
Do a right-click on the link above
and select “Copy Link”