Lattice homology, formality, and plumbed L-space links

  • Maciej Borodzik

    Polish Academy of Sciences, Warszawa, Poland
  • Beibei Liu

    The Ohio State University, Columbus, USA
  • Ian Zemke

    University of Oregon, Eugene, USA
Lattice homology, formality, and plumbed L-space links cover
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Abstract

We define a link lattice complex for plumbed links, generalizing constructions of Ozsváth, Stipsicz and Szabó, and of Gorsky and Némethi. We prove that for all plumbed links in rational homology 3-spheres, the link lattice complex is homotopy equivalent to the link Floer complex as an -module. Additionally, we prove that the link Floer complex of a plumbed L-space link is a free resolution of its homology. As a consequence, we give an algorithm to compute the link Floer complexes of plumbed L-space links, in particular of algebraic links, from their multivariable Alexander polynomial.

Cite this article

Maciej Borodzik, Beibei Liu, Ian Zemke, Lattice homology, formality, and plumbed L-space links. J. Eur. Math. Soc. (2024), published online first

DOI 10.4171/JEMS/1562