Birth date: 
Birth place: 
Date of death: 
Place of death: 
29 June 1904 
Lodz, Russian Empire (now Poland) 
6 Sept 1956 
Uxmal, Mexico 
Witold Hurewicz's father was an industrialist. Witold attended school in a Russian controlled Poland but with World War I beginning before he had begun secondary school, major changes occurred in Poland. In August 1915 the Russian forces which had held Poland for many years withdrew. Germany and AustriaHungary took control of most of the country and the University of Warsaw was refounded and it began operating as a Polish university. Rapidly a strong school of mathematics grew up in the University of Warsaw, with topology being one of the main topics. Although Hurewicz knew intimately the topology that was being studied in Poland he chose to go to Vienna to continue his studies. He studied under Hans Hahn and Karl Menger in Vienna, receiving a Ph.D. in 1926. Hurewicz was awarded a Rockefeller scholarship which allowed him to spend the year 192728 in Amsterdam. He was assistant to Brouwer in Amsterdam from 1928 to 1936. He was given study leave for a year which he decided to spend in the United States. He visited the Institute for Advanced Study in Princeton and then decided to remain in the United States and not return to his position in Amsterdam. Given the impending war in Europe this was clearly a wise decision. Hurewicz worked first at the University of North Carolina but during World War II he contributed to the war effort with research on applied mathematics, in particular the work he did on servomechanisms at that time was classified because of its military importance. From 1945 until his death he worked at the Massachusetts Institute of Technology. Hurewicz died falling off a ziggurat (a Mexican pyramid) on a conference outing at the International Symposium on algebraic topology in Mexico. In it is suggested that he was: ... a paragon of absentmindedness, a failing that probably led to his death.
Hurewicz's early work was on set theory and topology and : ... a remarkable result of this first period [1930] is his topological embedding of separable metric spaces into compact spaces of the same (finite) dimension.
In the field of general topology his contributions are centred around dimension theory. He wrote an important text Dimension theory published in 1941. A reviewer writes that the book: ... is truly a classic. It presents the theory of dimension for separable metric spaces with what seems to be an impossible mixture of depth, clarity, precision, succinctness, and comprehensiveness.
Hurewicz is best remembered for two remarkable contributions to mathematics, his discovery of the higher homotopy groups in 193536, and his discovery of exact sequences in 1941. His work led to homological algebra . It was during Hurewicz's time as Brouwer 's assistant in Amsterdam that he did the work on the higher homotopy groups; : ... the idea was not new, but until Hurewicz nobody had pursued it as it should have been. Investigators did not expect much new information from groups , which were obviously commutative ...
Hurewicz had a second textbook published, but this was not until 1958 after his death. Lectures on ordinary differential equations is a beautiful introduction to ordinary differential equations which again reflects the clarity of his thinking and the quality of his writing.
Source:School of Mathematics and Statistics University of St Andrews, Scotland
