Litcius/Paper detail

A generalization of Rasmussen’s invariant, with applications to surfaces in some four-manifolds

Ciprian Manolescu, Marco Marengon, Sucharit Sarkar, Michael Willis

2023Duke Mathematical Journal24 citationsDOIOpen Access PDF

Abstract

We extend the definition of Khovanov–Lee homology to links in connected sums of S1×S2’s and construct a Rasmussen-type invariant for null-homologous links in these manifolds. For certain links in S1×S2, we compute the invariant by reinterpreting it in terms of Hochschild homology. As applications, we prove inequalities relating the Rasmussen-type invariant to the genus of surfaces with boundary in the following 4-manifolds: B2×S2, S1×B3, CP2, and various connected sums and boundary sums of these. We deduce that Rasmussen’s invariant also gives genus bounds for surfaces inside homotopy 4-balls obtained from B4 by Gluck twists. Therefore, it cannot be used to prove that such homotopy 4-balls are nonstandard.

Topics & Concepts

MathematicsInvariant (physics)Pure mathematicsHomotopyHomology (biology)Connected sumGeneralizationKhovanov homologySimply connected spaceAlgebra over a fieldMathematical analysisMathematical physicsBiochemistryChemistryGeneGeometric and Algebraic TopologyHomotopy and Cohomology in Algebraic TopologyAdvanced Combinatorial Mathematics