Michael artin by nicole allen1
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- 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.