English

A splicing formula for the LMO invariant

Geometric Topology 2021-12-23 v2 Quantum Algebra

Abstract

We prove a "splicing formula" for the LMO invariant, which is the universal finite-type invariant of rational homology 33-spheres. Specifically, if a rational homology 33-sphere MM is obtained by gluing the exteriors of two framed knots K1M1K_1 \subset M_1 and K2M2K_2\subset M_2 in rational homology 33-spheres, our formula expresses the LMO invariant of MM in terms of the Kontsevich-LMO invariants of (M1,K1)(M_1,K_1) and (M2,K2)(M_2,K_2). The proof uses the techniques that Bar-Natan and Lawrence developed to obtain a rational surgery formula for the LMO invariant. In low degrees, we recover Fujita's formula for the Casson-Walker invariant and we observe that the second term of the Ohtsuki series is not additive under "standard" splicing. The splicing formula also works when each MiM_i comes with a link LiL_i in addition to the knot KiK_i, hence we get a "satellite formula" for the Kontsevich-LMO invariant.

Keywords

Cite

@article{arxiv.2001.03358,
  title  = {A splicing formula for the LMO invariant},
  author = {Gwenael Massuyeau and Delphine Moussard},
  journal= {arXiv preprint arXiv:2001.03358},
  year   = {2021}
}

Comments

25 pages

R2 v1 2026-06-23T13:07:47.085Z