Skip directly to content

Minimize RSR Award Detail

Research Spending & Results

Award Detail

Awardee:UNIVERSITY OF WASHINGTON
Doing Business As Name:University of Washington
PD/PI:
  • Jian J Zhang
  • (206) 616-1378
  • zhang@math.washington.edu
Co-PD(s)/co-PI(s):
  • Jonathan S Beardsley ~000755885
Award Date:11/30/2017
Estimated Total Award Amount: $ 21,920
Funds Obligated to Date: $ 21,920
  • FY 2018=$21,920
Start Date:03/01/2018
End Date:02/28/2019
Transaction Type:Grant
Agency:NSF
Awarding Agency Code:4900
Funding Agency Code:4900
CFDA Number:47.049
Primary Program Source:040100 NSF RESEARCH & RELATED ACTIVIT
Award Title or Description:Recent Developments in Noncommutative Algebra and Related Areas
Federal Award ID Number:1764210
DUNS ID:605799469
Parent DUNS ID:042803536
Program:ALGEBRA,NUMBER THEORY,AND COM
Program Officer:
  • Timothy Hodges
  • (703) 292-2113
  • thodges@nsf.gov

Awardee Location

Street:4333 Brooklyn Ave NE
City:Seattle
State:WA
ZIP:98195-0001
County:Seattle
Country:US
Awardee Cong. District:07

Primary Place of Performance

Organization Name:University of Washington
Street:4333 Brooklyn Ave NE
City:Seattle
State:WA
ZIP:98195-0001
County:Seattle
Country:US
Cong. District:07

Abstract at Time of Award

This award supports participation in the conference "Recent developments in noncommutative algebra and related areas", which will be held March 17-19, 2018 at the University of Washington, Seattle, Washington. The purpose of the conference is to survey recent developments and to chart new paths for further progress on several topics of active current interest in noncommutative algebra, with broad connections to other subjects such as combinatorics, algebraic geometry and mathematical physics. The conference will bring together researchers who work in noncommutative algebra and related areas, namely, algebraic geometry, representation theory and topology. The focus of the conference will be new research directions of several important topics such as noncommutative algebraic geometry, Hopf algebras and quantum groups, noncommutative invariant theory, higher category theory, and algebraic aspects of mathematical physics. Special effort will be made to bring together a group of junior researchers, women and underrepresented minorities, who are currently working in different directions, and to engage them in interdisciplinary activity through collaboration. More information can be found at the conference website: https://sites.math.washington.edu/~zhang/SeattleRDncAR2018/index.html

For specific questions or comments about this information including the NSF Project Outcomes Report, contact us.