Knot lattice homology and $q$-series invariants for plumbed knot complements

Rostislav Akhmechet; Peter K. Johnson; Sunghyuk Park

doi:10.4171/qt/236

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Knot lattice homology and $q$ -series invariants for plumbed knot complements

Rostislav Akhmechet
Columbia University, New York, USA
ORCID
Peter K. Johnson
USA
ORCID
Sunghyuk Park
Harvard University, Cambridge, USA
ORCID

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Abstract

We introduce an invariant of negative definite plumbed knot complements unifying knot lattice homology, due to Ozsváth, Stipsicz, and Szabó, and the BPS $q$ -series of Gukov and Manolescu. This invariant is a natural extension of weighted graded roots of negative definite plumbed 3-manifolds introduced earlier by the first two authors and Krushkal. We prove a surgery formula relating our invariant to the weighted graded root of the surgered 3-manifold.

Cite this article

Rostislav Akhmechet, Peter K. Johnson, Sunghyuk Park, Knot lattice homology and $q$ -series invariants for plumbed knot complements. Quantum Topol. (2025), published online first

DOI 10.4171/QT/236