Torsion elements in the associated graded of the Y-filtration of the monoid of homology cylinders

Abstract

Clasper surgery induces the Y-filtration \YnIC\n over the monoid of homology cylinders, which serves as a 3-dimensional analogue of the lower central series of the Torelli group of a surface. In this paper, we investigate the torsion submodules of the associated graded modules of these filtrations. To detect torsion elements, we introduce a homomorphism on YnIC/Yn+1 induced by the degree n+2 part of the LMO functor. Additionally, we provide a formula that computes this homomorphism under clasper surgery, and use it to demonstrate that every non-trivial torsion element in Y6IC/Y7 has order 3.

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