He is known mainly for his revolutionary advances in algebraic geometry, and also for major contributions to number theory, category theory and homological algebra, and his early achievements in functional analysis.
Cuz f*ck you
Alexander Grothendieck was born on March 28, 1928.
Alexander Grothendieck was born on March 28, 1928.
Yup! 4 kids. 1 from his first wife, 3 from his second wife Wife's: Mireille Dufour Justine Skalba
Alexander Grothendieck was 86 years old when he died on November 13, 2014 (birthdate: March 28, 1928).
Hes still alive
Alexander Grothendieck was a mathematician known for his work in algebraic geometry. Born in Germany in 1928, he spent much of his career in France. Grothendieck made significant contributions to mathematics, especially in the field of algebraic geometry, and his work had a profound impact on the development of modern mathematics. He was awarded the Fields Medal in 1966 for his contributions to algebraic geometry. Grothendieck's later life was marked by a retreat from mathematics and a reclusive lifestyle.
Archimedes, Newton, Gauss, Euler, Grothendieck
Yes. Twice. He generated 3 kids with his first wife and 1 with his second.
This is a really naive and stupid question. There is nothing more to say at this place. (And by the way, Grothendieck is written with a capital "G", and he usually calls himself "Alexandre", not "Alexander".)
Leonhard Euler Carl Gauss Isaac Newton Bernhard Riemann David Hilbert Alex. Grothendieck Pierre de Fermat Euclid Archimedes Henri Poincaré
A. Grothendieck has written: 'The tame fundamental group of a formal neighbourhood of a divisor with normal crossings on a scheme' -- subject(s): Algebraic Geometry, Fundamental groups (Mathematics), Schemes (Algebraic geometry), Topological groups 'Grothendieck-Serre correspondence' -- subject(s): Correspondence, Mathematicians, Algebraic Geometry 'Produits tensoriels topologiques et espaces nuclea ires' -- subject(s): Algebraic topology, Linear Algebras, Vector analysis 'Grothendieck-Serre correspondence' -- subject(s): Algebraic Geometry, Correspondence, Mathematicians