1. Michael ArtinNon-Commutative Algebra By Nicole Allen
2. Michael Artin Born June 28, 1934 Hamburg, Germany and lived
in Indiana Natalia Nauovna Jasny and Emil Artin were his
parents.
3. Artins Education Undergraduate Studies (Princeton
University) He received an A.B. in 1955. Harvard University He
received a PH.D in 1960 Dr. Oscar Aariski was his doctoral advisor
in 1960.
4. Accomplishments Artin was a Lecturer at Havard as Benjamin
Peirce Lecturer in 1960-63 Joined the MIT mathematics faculty in
1963 He became a professor in 1966 He was appointed Norbeer Wiener
Professor from 1988- 93 He served as Chair of the Undergraduate
Committee from 1994-97 and 1997-98.
5. Also served as President of the American Mathematical
Society form 1990-92 He received Honorary Doctoral degrees from the
University of Antwerp and University of Hamburg. He was selected
for Undergraduate Teaching Prize and the Educational and Graduate
Advising Award.
6. Professor Artin is an algebraic geometer. He is
concentrating on non-commutative algebra. He the early 1960s he
spent time in France, contributing to the SGA4 volumes. He worked
on problems that lead to approximation theorem, in local
algebra.
7. Honors 2005 Honored with the Harvard Graduate School of Arts
& Sciences Centennial Medal. Member of the National Academy of
Sciences Fellow Fellow of the American Academy of Arts &
Sciences Fellow of the American Association for the Advance applied
Mathematics. 2013 he received the Wolf Prize in Mathematics for
(his fundamental contributions to algebraic geometry and non
commutative geometry.
8. Non Commutative Algebraic Geometry Branch of mathematics and
study of the geometric properties of formal duals of
non-commutative algebraic objects, such as rings as well as
geometric objects derived from them. The non-commutative ring
generalizes are regular functions on a commutative scheme. Function
on usual spaces in the traditional algebraic geometry multiply by
points.
9. Conclusion I find Professor Michael Artin research on non
commutative algebraic geometry quite interesting and definitely
believe that his approach/ research will be a very significant
resources for a History of Math Courses years to come. His
techniques helps to us to study objects in commutative algebraic
geometry and this is a great value to the field of
mathematics.