Skip directly to content

Minimize RSR Award Detail

Research Spending & Results

Award Detail

Awardee:UNIVERSITY OF ALABAMA
Doing Business As Name:University of Alabama Tuscaloosa
PD/PI:
  • Bulent Tosun
  • (205) 348-5152
  • btosun@ua.edu
Award Date:06/14/2021
Estimated Total Award Amount: $ 156,405
Funds Obligated to Date: $ 156,405
  • FY 2021=$156,405
Start Date:07/01/2021
End Date:06/30/2024
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:The Topology of Contact Type Hypersurfaces and Related Topics
Federal Award ID Number:2105525
DUNS ID:045632635
Parent DUNS ID:808245794
Program:TOPOLOGY
Program Officer:
  • Swatee Naik
  • (703) 292-4876
  • snaik@nsf.gov

Awardee Location

Street:801 University Blvd.
City:Tuscaloosa
State:AL
ZIP:35487-0001
County:
Country:US
Awardee Cong. District:07

Primary Place of Performance

Organization Name:University of Alabama Tuscaloosa
Street:801 University Blvd.
City:Tuscaloosa
State:AL
ZIP:35478-0104
County:Peterson
Country:US
Cong. District:07

Abstract at Time of Award

This project, jointly funded by Topology and the Established Program to Stimulate Competitive Research (EPSCoR), centers around the geometry and topology of 3- and 4-dimensional spaces, mathematical objects known as symplectic and contact structures, and interactions between these. Symplectic and contact geometries are not just a natural language for some aspects of classical physics, but also naturally arise and find applications in many areas of modern mathematics and mathematical physics. The techniques spring from gauge theory, Floer theory, holomorphic curve techniques, and the theorems and conjectures find applications and connections in several fields, such as: smooth manifold topology, hyperbolic geometry, dynamics, complex analysis in several variables, and complex algebraic geometry. Building on his extensive and collaborative research, the PI aims to study many unique questions and conjectures that sit at the intersection of symplectic/contact topology and smooth manifold topology in low dimensions, and complex analysis. The proposed research and its outcomes will greatly impact our current understanding of geometric topology in low dimensions. As an integral part of this project, the PI will help mentor graduate students and postdoctoral fellows in his research area, maintain an active topology group at the University of Alabama by organizing seminars, workshops and conferences, and devote time to initiate a math circle in Tuscaloosa. The PI will investigate underlying connections between low dimensional smooth manifolds and certain geometric/analytic structures defined on them. The first long-term research objective of this project is to understand symplectic and complex geometric aspects of 3-manifold embedding problem in 4-space, and related symplectic/holomorphic rigidity phenomenon that develops. Specifically, the PI will work towards a complete resolution of Gompf’s conjecture that such embeddings are impossible for non-trivial Brieskorn spheres, determining the topology of contact type hypersurfaces and rationally convex Stein domains with prescribed boundary, and exploring their implications for smooth 4-manifold topology. The second long-term research objective concerns contributing concrete and satisfying connections between gauge theoretical invariants, symplectic/contact geometry and hyperbolic geometry. Towards this latter project, the PI will specifically work on two outstanding problems of existence and classification of tight and fillable contact structures on closed, oriented 3-manifolds. Many special cases of the latter project are understood due to work of the PI with his collaborators and other researchers in the area, but what links them remains to be explored. This award reflects NSF's statutory mission and has been deemed worthy of support through evaluation using the Foundation's intellectual merit and broader impacts review criteria.

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