George Pólya (1887–1985)
Autore di Come risolvere i problemi di matematica : logica ed euristica nel metodo matematico
Sull'Autore
Serie
Opere di George Pólya
Come risolvere i problemi di matematica : logica ed euristica nel metodo matematico (1945) 1,976 copie
Problems and Theorems in Analysis II: Theory of Functions, Zeros, Polynomials, Determinants, Number Theory, Geometry (1968) 49 copie
Analysis 2 copie
Analysis I 2 copie
Inequalities 2 copie
Opere correlate
Etichette
Informazioni generali
- Nome canonico
- Pólya, George
- Data di nascita
- 1887-12-13
- Data di morte
- 1985-09-07
- Sesso
- male
- Nazionalità
- Hungary
Switzerland
USA - Luogo di nascita
- Budapest, Austria-Hungary
- Luogo di morte
- Palo Alto, California, USA
- Istruzione
- University of Budapest (Ph.D|1912)
- Attività lavorative
- professor (mathematics)
- Relazioni
- Walter, Marion (student)
- Organizzazioni
- ETH Zurich
Stanford University - Premi e riconoscimenti
- American Academy of Arts and Sciences (1974)
National Academy of Sciences (1976)
Academie des Sciences
Hungarian Academy
Academie Internationale de Philosophie des Sciences - Breve biografia
- George Pólya (/ˈpoʊljə/; Hungarian: Pólya György [ˈpoːjɒ ˈɟørɟ]) (December 13, 1887 – September 7, 1985) was a Hungarian mathematician. He was a professor of mathematics from 1914 to 1940 at ETH Zürich and from 1940 to 1953 at Stanford University. He made fundamental contributions to combinatorics, number theory, numerical analysis and probability theory. He is also noted for his work in heuristics and mathematics education. He has been described as one of The Martians, a term used to refer to a group of prominent Jewish Hungarian scientists (mostly, but not exclusively, physicists and mathematicians) who emigrated to the United States in the early half of the 20th century [from Wikipedia: https://en.wikipedia.org/wiki/George_P...]
Utenti
Recensioni
Liste
Premi e riconoscimenti
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Autori correlati
Statistiche
- Opere
- 41
- Opere correlate
- 3
- Utenti
- 2,988
- Popolarità
- #8,544
- Voto
- 4.0
- Recensioni
- 19
- ISBN
- 79
- Lingue
- 10
- Preferito da
- 3
George Polya tænkte meget over det at tænke og hvordan man får ideer, når man ikke er Gearløs og har en tænkehat. Han nævner en conjecture af Euler om at tal af formen 8n+3 kan skrives som et kvadrattal + det dobbelte af et primtal. Barry Mazur skrev i 2012 at det stadig hverken er bevist eller modbevist. Euler var interesseret i at vise det, for så kunne han skrive alle tal som summen af tre trekanttal. Det har Gauss senere bevist i 1796 i Disquisitiones Arithmeticae.… (altro)