Projects per year
Fingerprint Dive into the research topics where Zoltan Szabo is active. These topic labels come from the works of this person. Together they form a unique fingerprint.
- 9 Similar Profiles
Floer Homology
Mathematics
Heegaard Floer Homology
Mathematics
Knot
Mathematics
Three-manifolds
Mathematics
Four-manifolds
Mathematics
Invariant
Mathematics
Surgery
Mathematics
Homology
Mathematics
Network
Recent external collaboration on country level. Dive into details by clicking on the dots.
Projects 2010 2022
Three-Dimensional Manifolds, Heegaard Floer Homology and Knot Theory
NSF - National Science Foundation
9/1/19 → 8/31/22
Project: Research project
Low Dimensional Topology and Holomorphic Disks
NSF - National Science Foundation
9/1/16 → 8/31/20
Project: Research project
Heegaard Floer Homology, Knots, and Three-manifolds
NSF - National Science Foundation
7/1/13 → 6/30/17
Project: Research project
Low Dimensional Topology and Heegaard Floer Homology
NSF - National Science Foundation
7/1/10 → 6/30/15
Project: Research project
Research Output 1994 2019
Bordered knot algebras with matchings
Ozsváth, P. S. & Szabó, Z., Jan 1 2019, In : Quantum Topology. 10, 3, p. 481-592 112 p.Research output: Contribution to journal › Article
Knot
Algebra
Invariant
Knot Invariants
Algebraic Structure
The dehn surgery characterization of the trefoil and the figure eight knot
Ozsváth, P. & Szabó, Z., Jan 1 2019, In : Journal of Symplectic Geometry. 17, 1, p. 251-266 16 p.Research output: Contribution to journal › Article
Trefoil
Dehn Surgery
Knot
Figure
Heegaard Floer Homology
3
Citations
(Scopus)
Kauffman states, bordered algebras, and a bigraded knot invariant
Ozsvath, P. S. & Szabo, Z., Apr 13 2018, In : Advances in Mathematics. 328, p. 1088-1198 111 p.Research output: Contribution to journal › Article
Knot Invariants
Knot
Algebra
Diagram
Differential Graded Algebra
A perturbation of the geometric spectral sequence in Khovanov homology
Sarkar, S., Seed, C. & Szabó, Z., Jan 1 2017, In : Quantum Topology. 8, 3, p. 571-628 58 p.Research output: Contribution to journal › Article
Khovanov Homology
Geometric progression
Spectral Sequence
Perturbation
Invariant
19
Citations
(Scopus)
Concordance homomorphisms from knot Floer homology
Ozsváth, P. S., Stipsicz, A. I. & Szabó, Z., Jul 31 2017, In : Advances in Mathematics. 315, p. 366-426 61 p.Research output: Contribution to journal › Article
Floer Homology
Concordance
Homomorphisms
Knot
Genus