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Srikanth B Iyengar
University Of Nebraska-Lincoln
$2,072,186
Attributed
$2,173,690
Total exposure
12
Grants
10
Lead (contact PI)
Attributed= this PI's even-split share of every grant they're on (the fair, additive number). Exposure = full size of all those grants.
Funding over time
peak $550K · FY2006–25$1M$750K$500K$250K$0
'06
'07
'08
'09
'10
'11
'12
'13
'14
'15
'16
'17
'18
'19
'20
'21
'22
'23
'24
'25
Funding mix
By agency
NSF$2,173,690 · 12
By mechanism
—$2,173,690 · 12
Top collaborators
- Claudia M Miller1 shared
- Dan Zacharia1 shared
- Graham J Leuschke1 shared
- Jon F Carlson1 shared
- Julia A Pevtsova1 shared
- Roger A Wiegand1 shared
- Sarah J Witherspoon1 shared
Grant awards (12)
Homological aspects of local algebra, with a view towards modularity$219,199
· FY2025 · MPS · contact PI
Local Algebra and Local Representation Theory$550,000
· FY2020 · MPS · contact PI
Homological Aspects of Commutative Algebra and Applications to Modular Representation Theory$299,999
· FY2017 · MPS · contact PI
Conference Proposal: Geometric and topological aspects of the representation theory of finite groups$38,880
· FY2016 · MPS · contact PI
Commutative algebra: homological and homotopical aspects$258,701
· FY2014 · MPS · contact PI
Commutative algebra: homological and homotopical aspects$252,662
· FY2012 · MPS · contact PI
Pan American Advanced Studies Institute: Commutative Algebra and Its Interactions with Algebraic Geometry, Representation Theory, and Physics; Guanajuato, Mexico; May 14-25, 2012$99,970
· FY2012 · O/D · contact PI
Interactions between Commutative Algebra and Representation Theory$17,465
· FY2012 · MPS
Derived categories of complete intersections and Hochschild cohomology$210,528
· FY2009 · MPS · contact PI
Commutative Algebra: Connections with Algebraic Topology and Representation Theory, May 17-22, 2008, Lincoln, Nebraska$25,000
· FY2008 · MPS
Derived invariants of commutative rings$139,043
· FY2006 · MPS · contact PI
Homological Invariants of Modules Over Commutative Rings$62,243
· FY2004 · MPS · contact PI