Litcius/Paper detail

Instanton Floer homology, sutures, and Heegaard diagrams

Zhenkun Li, Fan Ye

2022Journal of Topology17 citationsDOIOpen Access PDF

Abstract

This paper establishes a new technique that enables us to access some fundamental structural properties of instanton Floer homology. As an application, we establish, for the first time, a relation between the instanton Floer homology of a 3 $\hskip.001pt 3$ -manifold or a null-homologous knot inside a 3 $\hskip.001pt 3$ -manifold and the Heegaard diagram of that 3 $\hskip.001pt 3$ -manifold or knot. We further use this relation to compute the instanton knot homology of some families of ( 1 , 1 ) $(1,1)$ -knots, including all torus knots in S 3 $S^3$ , which were mostly unknown before. As a second application, we also study the relation between the instanton knot homology K H I ( Y , K ) $KHI(Y,K)$ and the framed instanton Floer homology I ♯ ( Y ) $I^\sharp (Y)$ . In particular, we prove the inequality dim C I ♯ ( Y ) ⩽ dim C K H I ( Y , K ) $\dim _\mathbb {C} I^\sharp (Y)\leqslant \dim _\mathbb {C}KHI(Y,K)$ for all rationally null-homologous knots K ⊂ Y $K\subset Y$ and we constructed a new decomposition of the framed instanton Floer homology of Dehn surgeries along K $K$ that corresponds to the decomposition along torsion spin c ${}^c$ decompositions in monopole and Heegaard Floer theory.

Topics & Concepts

Floer homologyInstantonMathematicsKnot (papermaking)Homology (biology)Heegaard splittingCombinatoricsPure mathematicsMathematical physicsFibered knotAmino acidBiochemistrySymplectic geometryChemistryChemical engineeringEngineeringGeometric and Algebraic TopologyBotulinum Toxin and Related Neurological DisordersHomotopy and Cohomology in Algebraic Topology
Instanton Floer homology, sutures, and Heegaard diagrams | Litcius