Risultati di ricerca
Bruce Kleiner. Silver Professor of Mathematics. Chair, Department of Mathematics. bkleiner@cims.nyu.edu. 212-998-3214. Warren Weaver Hall, Office 629. http://math.nyu.edu/~bkleiner/ Education. Ph.D., Mathematics, University of California, Berkeley, USA, 1990. B.A., Mathematics, University of California, Berkeley, USA, 1985. Research Interests.
Bruce Kleiner. Bruce Alan Kleiner is an American mathematician, working in differential geometry and topology and geometric group theory . He received his Ph.D. in 1990 from the University of California, Berkeley. His advisor was Wu-Yi Hsiang. Kleiner is a professor of mathematics at New York University .
- Wu-Yi Hsiang
- NAS Award for Scientific Reviewing (2013), Simons Fellow in Mathematics (2014)
Bruce Kleiner. Office: 817 Warren Weaver Hall Email: bkleiner@cims.nyu.edu Telephone: 212-998-3214 FAX: 212-995-4121 The best way to contact me is by email.
Bruce Kleiner. Silver Professor of Mathematics. Chair, Department of Mathematics. bkleiner@cims.nyu.edu. 212-998-3214. Warren Weaver Hall, Office 629. http://math.nyu.edu/~bkleiner/ Education. Ph.D., Mathematics, University of California, Berkeley, USA, 1990. B.A., Mathematics, University of California, Berkeley, USA, 1985. Research Interests.
Bruce Kleiner. Silver Professor of Mathematics. Chair, Department of Mathematics. bkleiner@cims.nyu.edu. 212-998-3214. Warren Weaver Hall, Office 629. http://math.nyu.edu/~bkleiner/ Education. Ph.D., Mathematics, University of California, Berkeley, USA, 1990. B.A., Mathematics, University of California, Berkeley, USA, 1985. Research Interests.
12 set 2022 · Bruce Kleiner (New York University) Monday, September 12, 2022 Workshop on Geometry of Spaces with Upper and Lower Curvature Bounds http://www.fields.utoronto.ca/activit...
- 64 min
- 202
- Fields Institute
14 giu 2016 · Robert Haslhofer, Bruce Kleiner. First published: 14 June 2016. https://doi.org/10.1002/cpa.21650. Citations: 49. Tools. Share. Abstract. In the last 15 years, White and Huisken-Sinestrari developed a far-reaching structure theory for the mean curvature flow of mean convex hypersurfaces.