83 research outputs found
Computing HF^ by factoring mapping classes
Bordered Heegaard Floer homology is an invariant for three-manifolds with
boundary. In particular, this invariant associates to a handle decomposition of
a surface F a differential graded algebra, and to an arc slide between two
handle decompositions, a bimodule over the two algebras. In this paper, we
describe these bimodules for arc slides explicitly, and then use them to give a
combinatorial description of HF^ of a closed three-manifold, as well as the
bordered Floer homology of any 3-manifold with boundary.Comment: 106 pages, 46 figure
A refinement of Rasmussen's s-invariant
In a previous paper we constructed a spectrum-level refinement of Khovanov
homology. This refinement induces stable cohomology operations on Khovanov
homology. In this paper we show that these cohomology operations commute with
cobordism maps on Khovanov homology. As a consequence we obtain a refinement of
Rasmussen's slice genus bound s for each stable cohomology operation. We show
that in the case of the Steenrod square Sq^2 our refinement is strictly
stronger than s.Comment: 26 pages, 2 figure
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