Bridge trisections in \(\mathbb{CP}^2\) and the Thom conjecture
From MaRDI portal
Publication:2004533
DOI10.2140/gt.2020.24.1571OpenAlexW2884878520MaRDI QIDQ2004533
Publication date: 7 October 2020
Published in: Geometry \& Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1807.10131
Symplectic and contact topology in high or arbitrary dimension (57R17) Embeddings in differential topology (57R40) General topology of 4-manifolds (57K40)
Related Items
Simplifying indefinite fibrations on 4-manifolds, Skein lasagna modules for 2-handlebodies, An algorithm taking Kirby diagrams to trisection diagrams, Trisection diagrams and twists of 4-manifolds, A generalization of Rasmussen's invariant, with applications to surfaces in some four-manifolds, MATRIX-MFO tandem workshop: Invariants and structures in low-dimensional topology. Abstracts from the MATRIX-MFO tandem workshop held September 5--11, 2021 (hybrid meeting), The minimal genus problem -- a quarter century of progress, Symplectic surfaces and bridge position
Cites Work
- Unnamed Item
- Trisecting 4-manifolds
- Khovanov homology and the slice genus
- The self-linking number in annulus and pants open book decompositions
- Stein \(4\)-manifolds with boundary and contact structures
- Gauge theory for embedded surfaces. I
- A product formula for the Seiberg-Witten invariants and the generalized Thom conjecture
- Absolutely graded Floer homologies and intersection forms for four-manifolds with boundary
- Bounds on genus and geometric intersections from cylindrical end moduli spaces
- The genus of embedded surfaces in the projective plane
- The symplectic Thom conjecture
- Quasipositivity as an obstruction to sliceness
- Chirurgies d'indice un et isotopies de sphères dans les variétés de contact tendues
- Bridge trisections of knotted surfaces in 4-manifolds
- Bridge trisections of knotted surfaces in 𝑆⁴
- An Introduction to Contact Topology
- RASMUSSEN INVARIANT, SLICE-BENNEQUIN INEQUALITY, AND SLICENESS OF KNOTS
