Nicolas Bourbaki

Source: Wikipedia. Pages: 30. Chapters: Alexander Grothendieck, Armand Borel, Charles Ehresmann, Claude Chevalley, François Bruhat, Henri Cartan, Hyman Bass, Jacques Dixmier, Jacques Tits, Jean-Louis Koszul, Jean-Pierre Serre, Jean Delsarte, Jean Dieudonné, John Tate, Laurent Schwartz, Michel Demazure, Pierre Cartier (mathematician), Pierre Samuel, René de Possel, Roger Godement, Samuel Eilenberg, Séminaire Nicolas Bourbaki, Séminaire Nicolas Bourbaki (1950-1959), Séminaire Nicolas Bourbaki (1960-1969), Serge Lang, Szolem Mandelbrojt. Excerpt: Alexander Grothendieck (German: ; French: ; born 28 March 1928) is a mathematician and the central figure behind the creation of the modern theory of algebraic geometry. His research program vastly extended the scope of the field, incorporating major elements of commutative algebra, homological algebra, sheaf theory, and category theory into its foundations. This new perspective led to revolutionary advances across many areas of pure mathematics. Within algebraic geometry itself, his theory of schemes has become the universally accepted language for all further technical work. His generalization of the classical Riemann-Roch theorem launched the study of algebraic and topological K-theory. His construction of new cohomology theories has left deep consequences for algebraic number theory, algebraic topology, and representation theory. His creation of topos theory has had an impact on set theory and logic. One of his most celebrated achievements is the discovery of the first arithmetic Weil cohomology theory: the l-adic étale cohomology. This key result opened the way for a proof of the Weil conjectures, ultimately completed by his student Pierre Deligne. To this day, l-adic cohomology remains a fundamental tool for number theorists, with important applications to the Langlands program. Grothendieck's way of thinking has influenced generations of mathematicians long after his departure from mathematics. His emphasis on the role of universal properties brought category theory into the mainstream as an important organizing principle. His notion of abelian category is now the basic object of study in homological algebra. His conjectural theory of motives has been a driving force behind modern developments in algebraic K-theory, motivic homotopy theory, and motivic integration. Driven by deep personal and political convictions, Grothendieck left the Institut des Hautes Études Scientifiques, where he had been appointed professor and accomplished his greatest work, after a