On September 7, 1985, Pólya died in Palo Alto, California, United States[9] due to complications of a stroke he suffered during that summer.
Heuristics
Early in his career, Pólya wrote with Gábor Szegő two influential problem books, Problems and Theorems in Analysis (I: Series, Integral Calculus, Theory of Functions and II: Theory of Functions. Zeros. Polynomials. Determinants. Number Theory. Geometry). Later in his career, he spent considerable effort to identify systematic methods of problem-solving to further discovery and invention in mathematics for students, teachers, and researchers.[10] He wrote five books on the subject: How to Solve It, Mathematics and Plausible Reasoning (Volume I: Induction and Analogy in Mathematics, and Volume II: Patterns of Plausible Inference), and Mathematical Discovery: On Understanding, Learning, and Teaching Problem Solving (volumes 1 and 2).
In How to Solve It, Pólya provides general heuristics for solving a gamut of problems, including both mathematical and non-mathematical problems. The book includes advice for teaching students of mathematics and a mini-encyclopedia of heuristic terms. It was translated into several languages and has sold over a million copies. The book is still used in mathematical education. Douglas Lenat's Automated Mathematician and Eurisko artificial intelligence programs were inspired by Pólya's work.
In addition to his works directly addressing problem solving, Pólya wrote another short book called Mathematical Methods in Science, based on a 1963 work supported by the National Science Foundation edited by Leon Bowden and published by the Mathematical Association of America (MAA) in 1977. As Pólya notes in the preface, Bowden carefully followed a tape recording of a course Pólya gave several times at Stanford in order to put the book together. Pólya notes in the preface "that the following pages will be useful, yet they should not be regarded as a finished expression."
Legacy
There are three prizes named after Pólya, causing occasional confusion of one for another. In 1969 the Society for Industrial and Applied Mathematics (SIAM) established the George Pólya Prize, given alternately in two categories for "a notable application of combinatorial theory" and for "a notable contribution in another area of interest to George Pólya."[11]
Mathematik und plausibles Schliessen. Birkhäuser, Basel 1988,
Induktion und Analogie in der Mathematik, 3rd edn., ISBN3-7643-1986-0 (Wissenschaft und Kultur; 14).
Typen und Strukturen plausibler Folgerung, 2nd edn., ISBN3-7643-0715-3 (Wissenschaft und Kultur; 15).
– English translation: Mathematics and Plausible Reasoning, Princeton University Press 1954, 2 volumes (Vol. 1: Induction and Analogy in Mathematics, Vol. 2: Patterns of Plausible Inference)
Schule des Denkens. Vom Lösen mathematischer Probleme ("How to solve it"). 4th edn. Francke Verlag, Tübingen 1995, ISBN3-7720-0608-6 (Sammlung Dalp).
Vom Lösen mathematischer Aufgaben. 2nd edn. Birkhäuser, Basel 1983, ISBN3-7643-0298-4 (Wissenschaft und Kultur; 21).
– English translation: Mathematical Discovery: On Understanding, Learning and Teaching Problem Solving, 2 volumes, Wiley 1962 (published in one vol. 1981)
Collected Papers, 4 volumes, MIT Press 1974 (ed. Ralph P. Boas). Vol. 1: Singularities of Analytic Functions, Vol. 2: Location of Zeros, Vol. 3: Analysis, Vol. 4: Probability, Combinatorics
with R. C. Read: Combinatorial enumeration of groups, graphs, and chemical compounds, Springer Verlag 1987 (English translation of Kombinatorische Anzahlbestimmungen für Gruppen, Graphen und chemische Verbindungen, Acta Mathematica, vol. 68, 1937, pp. 145–254) ISBN978-0387964133
^Harold D. Taylor, Loretta Taylor (1993). George Pólya: master of discovery 1887–1985. Dale Seymour Publications. p. 50. ISBN978-0-86651-611-2. Plancherel was a military man, a colonel in the Swiss army, and a devout Catholic; Pólya did not like military ceremonies or activities, and he was an agnostic who objected to hierarchical religions.
^"George Pólya". Mathematics Genealogy Project. Retrieved January 10, 2023.
^Roberts, A. Wayne (1995). Faces of Mathematics, Third Edition. New York, NY USA: HarperCollins College Publishers. p. 479. ISBN0-06-501069-8.
^Pólya, G. "Ueber eine Eigenschaft des Gaussschen Fehlergesetzes". In: Atti del Congresso Internazionale dei Matematici: Bologna del 3 al 10 de settembre di 1928. Vol. 6. pp. 63–64.
