Torsion in Khovanov homology of homologically thin knots
Abstract
We prove that every Z2H-thin link has no 2k-torsion for k>1 in its Khovanov homology. Together with previous results by Eun Soo Lee and the author, this implies that integer Khovanov homology of non-split alternating links is completely determined by the Jones polynomial and signature. Our proof is based on establishing an algebraic relation between Bockstein and Turner differentials on Khovanov homology over Z2. We conjecture that a similar relation exists between the corresponding spectral sequences.
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